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Loewner’s theorem for maps on operator domains

Published online by Cambridge University Press:  16 May 2022

Michiya Mori
Affiliation:
Interdisciplinary Theoretical and Mathematical Sciences Program (ITHEMS), RIKEN, 2-1 Hirosawa, Wako, Saitama 351-0198, Japan e-mail: [email protected]
Peter Šemrl*
Affiliation:
Faculty of Mathematics and Physics, University of Ljubljana, Jadranska 19, SI-1000 Ljubljana, Slovenia and Department of Mathematics, Institute of Mathematics, Physics, and Mechanics, Jadranska 19, SI-1000 Ljubljana, Slovenia
*
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Abstract

The classical Loewner’s theorem states that operator monotone functions on real intervals are described by holomorphic functions on the upper half-plane. We characterize local order isomorphisms on operator domains by biholomorphic automorphisms of the generalized upper half-plane, which is the collection of all operators with positive invertible imaginary part. We describe such maps in an explicit manner, and examine properties of maximal local order isomorphisms. Moreover, in the finite-dimensional case, we prove that every order embedding of a matrix domain is a homeomorphic order isomorphism onto another matrix domain.

Type
Article
Copyright
© The Author(s), 2022. Published by Cambridge University Press on behalf of The Canadian Mathematical Society

1 Introduction

A real function f defined on an open interval $(a, b)$ is said to be matrix monotone of order n if for every pair of $n\times n$ hermitian matrices $X, Y$ whose eigenvalues belong to $(a, b)$ we have $X\le Y \Rightarrow f(X)\le f(Y)$ . If f is a matrix monotone function of order n for all positive integers n, we say that f is operator monotone. The study of operator monotone functions was initiated by Loewner [Reference Loewner5]. His famous theorem states that a function $f : (a, b) \to {{\mathbb {R}}}$ is operator monotone if and only if f has an analytic continuation to the upper half-plane $\Pi $ which maps $\Pi $ into itself, and this is true if and only if f has an analytic extension to $(\mathbb {C} \setminus \mathbb {R}) \cup (a,b)$ which maps the upper half-plane $\Pi $ into itself, and the extension to the lower half-plane is obtained by the reflection across the real line. The theory of operator monotone functions has found many important applications (see, for example, [Reference Kubo and Ando4, Reference Wigner and von Neumann14]). Over the years, enormous interest has been paid to this deep theorem. Recently, a multivariable version has been obtained [Reference Agler, McCarthy and Young1]. See Donoghue’s book [Reference Donoghue2] for further information about the classical Loewner’s theorem. A number of alternative proofs can be found in Simon’s book [Reference Simon12]. Furthermore, a review of this book [Reference McCarthy6] can serve as a quick gentle introduction to this topic.

We are going to consider a much more general setting. Let H be a complex Hilbert space. To avoid trivialities, we assume throughout the paper that H has dimension at least $2$ . We denote by $B(H)$ the algebra of all bounded linear operators on H, and by $S(H)$ the subset of all self-adjoint operators. Let $U,V$ be subsets of $S(H)$ . A map $\phi : U \to V$ preserves order (in one direction) if for every pair $X, Y\in U$ we have $X\le Y \Rightarrow \phi (X)\le \phi (Y)$ , and it is an order embedding (or preserves order in both directions) if for every pair $X, Y\in U$ we have $X\le Y \iff \phi (X)\le \phi (Y)$ . It is easy to see that an order embedding is injective. If $\phi $ is a bijective order embedding, it is called an order isomorphism.

A nonempty subset $U \subset S(H)$ will be called an operator domain if it is open and connected. Here and throughout the paper, the topology on $B(H)$ is induced by the operator norm. Let U be an operator domain. A map $\phi : U\to S(H)$ is defined to be a local order isomorphism if for every $X\in U$ there are operator domains $V, W$ with $X\in V\subset U, W\subset S(H)$ , such that $\phi (V)=W$ and $\phi : V\to W$ is an order isomorphism. The generalized upper half-plane $\Pi (H)$ is the collection of all operators of the form $X+iY$ , where $X\in S(H)$ and Y is a positive invertible operator in $S(H)$ . The generalized lower half-plane $\Pi (H)^{\ast } = \{ X^{\ast } \, : \, X \in \Pi (H) \}$ is the set of all bounded operators on H whose imaginary part is negative and invertible.

We are now ready to formulate our main theorem.

Theorem 1.1 Let $U \subset S(H)$ be an operator domain. The following conditions are equivalent for a map $\phi : U \to S(H)$ .

  • The map $\phi $ is a local order isomorphism.

  • The map $\phi $ has a unique continuous extension to $U \cup \Pi (H)$ that maps $\Pi (H)$ biholomorphically onto itself.

  • There exist open connected sets ${\mathcal {U}}, {\mathcal {V}}\subset B(H)$ such that $U \cup \Pi (H) \cup \Pi (H)^{\ast } \subset {\mathcal {U}}$ and $\phi $ has an extension to a biholomorphic map from ${\mathcal {U}}$ onto ${\mathcal {V}}$ that maps $\Pi (H)$ onto itself and $\Pi (H)^{\ast }$ onto itself.

Biholomorphy in our statement replaces holomorphy in the classical Loewner theory, and local order isomorphisms appear in the place of operator monotone functions. This is inevitable. It is not difficult to construct order preserving maps on operator domains that do not have holomorphic extensions to the generalized upper half-plane even under the additional assumptions of bijectivity and continuity. Local operator monotonicity appears already in the scalar case (see [Reference Simon12, Theorem 6.2]).

We have a much better result in the matrix case. We denote by $M_n$ the set of all $n\times n$ complex matrices and by $S_n$ the set of all $n\times n$ hermitian matrices. The corresponding generalized upper half-plane $\Pi _n$ is the collection of all $n\times n$ complex matrices whose imaginary part is a positive invertible matrix. To avoid unnecessary repetition, we present a version with only the generalized upper half-plane involved.

Theorem 1.2 Let $n\ge 2$ and $U\subset S_n$ be a matrix domain. A map $\phi : U\to S_n$ is an order embedding if and only if $\phi $ has a unique continuous extension to $U \cup \Pi _n$ that maps $\Pi _n$ biholomorphically onto itself.

Compare our results with [Reference Pascoe and Tully-Doyle9], in which Pascoe and Tully-Doyle studied a “free” analogue of the classical Loewner’s theorem, and discovered the relation between order preserving maps and holomorphic maps of the generalized upper half-plane under the assumption of freeness.

In the second section, we will prove that the third condition in the main theorem implies the first one. We will start with maps that are not biholomorphic but only holomorphic on the generalized upper half-plane and verify that this assumption is enough to yield the monotonicity on line segments. The next section will be devoted to the proof that every local order isomorphism has a unique continuous extension that restricts to a biholomorphic automorphism of the generalized upper half-plane. We will continue by giving explicit formulae for biholomorphic automorphisms of the generalized upper half-plane and local order isomorphisms. As a by-product, we will complete the proof of the main theorem. In order to understand local order isomorphisms, we only need to study maximal ones, which we classify by a natural equivalence relation. We also give a necessary and sufficient condition for a maximal local order isomorphism to be an order isomorphism. The crucial step in the proof of Theorem 1.2 is an automatic continuity result for order embeddings of matrix domains. An explicit matrix formula for maximal order embeddings will be given. In the last section, we will present examples illustrating the optimality of our results, and show that they unify and significantly extend all known results on order isomorphisms of operator intervals (see [Reference Šemrl11] and the references therein).

2 From biholomorphic maps to local order isomorphisms

We recall two definitions. Let $U\subset {\mathcal {B}}$ be an open subset of a real Banach space. A map $\phi : U\to {\mathcal {B}}$ is Gateaux differentiable if for any $X\in U$ there exists a map $D\phi (X): {\mathcal {B}}\to {\mathcal {B}}$ such that

$$ \begin{align*}\left\|\frac{\phi(X+\varepsilon Y) - \phi(X)}{\varepsilon} - (D\phi(X))(Y)\right\| \to 0 \end{align*} $$

as ${\mathbb {R}}\ni \varepsilon \to 0$ for every $Y\in {\mathcal {B}}$ .

Let ${\mathcal {U}}\subset {\mathcal {B}}$ be an open subset of a complex Banach space. A map $\phi : U\to {\mathcal {B}}$ is holomorphic or Fréchet differentiable if for any $X\in U$ there exists a bounded complex-linear map $D\phi (X): {\mathcal {B}}\to {\mathcal {B}}$ such that

$$ \begin{align*}\frac{\|\phi(X+Y) - \phi(X) - (D\phi(X))(Y)\|}{\| Y\|} \to 0 \end{align*} $$

as $\| Y \|\to 0$ . Let ${\mathcal {U}}, {\mathcal {V}}\subset {\mathcal {B}}$ be open subsets of a complex Banach space. A map $\phi : {\mathcal {U}}\to {\mathcal {V}}$ is said to be biholomorphic if $\phi $ is bijective and both $\phi $ and $\phi ^{-1}$ are holomorphic.

For two operators $A, B\in S(H)$ , we write $A<B$ if $A\le B$ and $B-A$ is invertible in $B(H)$ .

Lemma 2.1 Let $U\subset S(H)$ be an operator domain. Suppose that $\phi : U\to S(H)$ is a Gateaux differentiable map with $(D\phi (X)) (A)\ge 0$ for any $X\in U$ and $A\in S(H)$ with $A\ge 0$ . If $X, Y\in U$ satisfy $X\le Y$ and $(1-c)X+cY\in U$ for any real number $0\le c\le 1$ , then $\phi (X)\le \phi (Y)$ .

Proof For a positive real number $a>0$ , consider the Gateaux differentiable map $\phi _a : U\to S(H)$ defined by $\phi _a(X)=\phi (X)+aX$ . Then we have $(D\phi _a(X)) (A)> 0$ for any $X\in U$ and $A\in S(H)$ with $A> 0$ . It suffices to show the statement for $\phi _a$ instead of $\phi $ for every positive real number $a>0$ .

Let us assume $X<Y$ first. For each real number $c\in [0, 1)$ , we have $(D\phi _a((1-c)X+cY))(Y-X)>0$ . Since $(D\phi _a((1-c)X+cY))(Y-X)$ is equal to

$$ \begin{align*}\lim_{\varepsilon\to 0} \frac{\phi_a((1-c)X+cY + \varepsilon (Y-X)) - \phi_a((1-c)X+cY)}{\varepsilon} , \end{align*} $$

there exists a positive real number $ 0 <\varepsilon \le 1-c$ such that $\phi _a((1-c)X+cY + \varepsilon (Y-X))> \phi _a((1-c)X+cY)$ . In other words, if we define $X_c = (1-c)X + cY$ , $c \in [0,1]$ , then for every $c \in [0,1)$ , there exists d such that $c < d \le 1$ and $\phi _a (X_c) < \phi _a (X_d)$ . Moreover, the Gateaux differentiability of $\phi _a$ implies that the map $[0, 1]\ni c\mapsto \phi _a(X_c)$ is continuous. Thus, $\sup \{c\in (0, 1]\, : \, \phi _a((1-c)X+cY)\ge \phi _a(X)\}=1$ , so we obtain $\phi _a(X)\le \phi _a(Y)$ .

Consider the general case $X\le Y$ . Since the collection $\{(1-c)X+cY\, : \, c\in [0, 1]\}$ is compact, there exists a positive real number $\varepsilon>0$ such that $(1-c)X+c(Y +d I)\in U$ for all $c\in [0, 1], d\in (0, \varepsilon ]$ . The preceding paragraph implies $\phi _a(X)\le \phi _a(Y+dI)$ for any $d\in (0, \varepsilon ]$ . Take the limit $d\to 0$ to obtain $\phi _a(X)\le \phi _a(Y)$ .▪

In the last section, we will present examples showing that when considering maps on operator domains, we need to assume that order is (at least locally) preserved in both directions if we want to get any reasonable result. Then it is natural that, in our analogue of the Loewner’s theorem, the holomorphy is replaced by the biholomorphy. Nevertheless, when dealing with the easier implication of our main theorem, the situation is similar to the scalar case. That is, just the holomorphy is enough to deduce the monotonicity on line segments.

Theorem 2.2 Let ${\mathcal {U}} \subset B(H)$ be an open subset with ${\mathcal {U}}\cap S(H)\neq \emptyset $ and $\Pi (H)\subset {\mathcal {U}}$ . Let $U \subset {\mathcal {U}}\cap S(H)$ be an operator domain. Suppose that $\phi : {\mathcal {U}}\to B(H)$ is a holomorphic map with $\phi (U)\subset S(H)$ and $\phi (\Pi (H))\subset \Pi (H)$ . If $X, Y\in U$ satisfy $X\le Y$ and $(1-c)X+cY\in U$ for any real number $0\le c\le 1$ , then $\phi (X)\le \phi (Y)$ .

Proof Let $X\in U$ and $A\in S(H)$ , $A\ge 0$ . The assumption $\phi (U)\subset S(H)$ implies

$$ \begin{align*}(D\phi(X))(A) = \lim_{t \to 0} {1 \over t} (\phi (X+ tA) - \phi (X))\in S(H). \end{align*} $$

Since $\phi $ restricts to a holomorphic map of $\Pi (H)$ into itself, we have $(D\phi (X))(iA) = i (D\phi (X))(A)\in \overline {\Pi (H)}$ , and thus $(D\phi (X))(A)\ge 0$ . It follows that $\phi $ restricted to U satisfies the assumption of the preceding lemma.▪

We are now ready to prove one of the implications in our main result.

Theorem 2.3 Let ${\mathcal {U}}, {\mathcal {V}}\subset B(H)$ be open subsets with ${\mathcal {U}}\cap S(H)\neq \emptyset $ and $\Pi (H) \cup \Pi (H)^{\ast } \subset {\mathcal {U}}$ . Let $U \subset {\mathcal {U}}\cap S(H)$ be an operator domain. Suppose that $\phi : {\mathcal {U}}\to {\mathcal {V}}$ is a biholomorphic map that restricts to a biholomorphic automorphism of $\Pi (H)$ and also to a biholomorphic automorphism of $\Pi (H)^{\ast }$ . Then $\phi $ restricts to a local order isomorphism of U.

Proof Because $\phi : {\mathcal {U}}\to {\mathcal {V}}$ and $\phi ^{-1} : {\mathcal {V}}\to {\mathcal {U}}$ are continuous bijections and $\phi (\Pi (H)) = \Pi (H)$ and $\phi (\Pi (H)^{\ast }) = \Pi (H)^{\ast }$ , we have $\phi ({\mathcal {U}}\cap S(H)) = {\mathcal {V}}\cap S(H)$ . It follows that $\phi (U)$ is an operator domain in $S(H)$ . Let $X_0\in U$ . By the continuity of $\phi $ , we may take a neighborhood $X_0\in V\subset U$ with the following two properties:

  • For any pair $X, Y\in V$ with $X\le Y$ and any $c\in [0, 1]$ , $(1-c)X+cY\in U$ holds.

  • For any pair $X, Y\in \phi (V)$ with $X\le Y$ and any $c\in [0, 1]$ , $(1-c)X+cY\in \phi (U)$ holds.

Hence, by Theorem 2.2, $\phi $ restricts to an order isomorphism from V onto $\phi (V)$ .▪

3 From local order isomorphisms to biholomorphic maps

We first prove a kind of the identity theorem in the operator setting.

Proposition 3.1 Let ${\cal U} \subset B(H)$ be an open connected set, $\emptyset \neq U\subset {\cal U}\cap S(H)$ an operator domain, and $\xi : {\cal U} \to B(H)$ a holomorphic map with $\xi (X)=0$ for every $X \in U$ . Then $\xi (X)=0$ for all $X\in {\cal U}$ .

Proof Fix $X\in U$ . Take a positive real number $c>0$ such that $X+Y\in {\cal U}$ for any $Y\in B(H)$ with $\| Y \|\le 2c$ , and $X+Y\in U$ for any $Y\in S(H)$ with $\| Y \|\le 2c$ . Fix an operator $Y\in B(H)$ with $\| Y \|\le c$ . We prove $\xi (X+Y)=0$ . Take operators $Y_1, Y_2\in S(H)$ such that $Y=Y_1+iY_2$ . Then $\| Y_1 \|, \| Y_2\|\le c$ . For each $x, y\in H$ , consider the holomorphic map $z \mapsto \langle \xi (X+Y_1+zY_2)x, y\rangle $ from some open neighborhood of the closure of ${\mathbb {D}}:=\{z\in {\mathbb {C}}\, :\, |z|<1\}$ into ${\mathbb {C}}$ . We have $X+Y_1+tY_2\in U$ for any $t\in [-1, 1]$ , and hence $\langle \xi (X+Y_1+tY_2)x, y\rangle =0$ , $t\in [-1, 1]$ . The identity theorem implies $\langle \xi (X+Y_1+zY_2)x, y\rangle = 0$ for any $z\in \overline {\mathbb {D}}$ . It follows $\xi (X+Y)=\xi (X+Y_1+iY_2)=0$ .

Consider the collection

$$ \begin{align*}{\cal U}_0 := \{X\in {\cal U}\, : \, \xi(Y)=0\text{ holds for every element }Y\text{ in some neighborhood of }X\}. \end{align*} $$

Then ${\cal U}_0\supset U$ and ${\cal U}_0$ is open. Let $X\in {\cal U}$ . Take a continuous path $\tau : [0, 1]\to {\cal U}$ such that $\tau (0)\in {\cal U}_0$ , $\tau (1)=X$ . Then the collection $V=\{t\in [0, 1] \, : \, \tau (t)\in {\cal U}_0\}$ is open in $[0, 1]$ . We prove V is closed. Let $t\in [0, 1]$ be in the closure of V. Since ${\cal U}$ is open and $\tau $ is continuous, we may take numbers $s\in [0, 1]$ and $c>0$ such that $\tau (s)\in {\cal U}_0$ , $\tau (s)+Y\in {\cal U}$ for any $Y\in B(H)$ with $\| Y\|\le c$ and $\|\tau (s)-\tau (t)\|<c$ . Consider the holomorphic function $z\mapsto \langle \xi (\tau (s)+ zY)x, y\rangle $ on ${\mathbb {D}}$ , for $Y\in B(H)$ with $\| Y\|\le c$ and $x, y\in H$ . Then the identity theorem implies that this map is the constant $0$ map, and we have $t\in V$ . We obtain $X = \tau (1) \in {\cal U}_0$ , which completes the proof.▪

For $A, B\in S(H)$ with $A\le B$ , we define $[A, B] := \{X\in S(H)\, :\, A\le X\le B\}$ . For $A\in S(H)$ , we define $[A, \infty ) := \{X\in S(H)\, :\, A\le X\}$ , $(A, \infty ) := \{X\in S(H)\, :\, A< X\}$ , $(-\infty , A] := \{X\in S(H)\, :\, X\le A\}$ , and $(-\infty , A) := \{X\in S(H)\, :\, X< A\}$ . For $A, B\in S(H)$ with $A< B$ , we define $[A, B) := \{X\in S(H)\, :\, A\le X< B\}$ , $(A, B] := \{X\in S(H)\, :\, A< X\le B\}$ , and $(A, B) := \{X\in S(H)\, :\, A< X< B\}$ . Such collections are called operator intervals.

Lemma 3.2 Let $U\subset S(H)$ be an operator domain, and let $\phi : U\to S(H)$ be a local order isomorphism. Then, for any $X\in U$ , there exist operators $A, B\in U$ such that $A<X<B$ , $[A, B]\subset U$ , $\phi (A)<\phi (X)<\phi (B)$ , $[\phi (A), \phi (B)]\subset \phi (U)$ , $\phi ([A, B]) = [\phi (A), \phi (B)]$ , and $\phi : [A, B]\to [\phi (A), \phi (B)]$ is an order isomorphism.

Proof By the definition of local order isomorphisms, it suffices to prove the statement with the additional assumption that $\phi $ is an order isomorphism from U onto the operator domain $\phi (U)$ .

Let $X, Y\in U$ satisfy $X<Y$ . We prove $\phi (X)<\phi (Y)$ . Since $\phi $ preserves order, we have $\phi (X)\le \phi (Y)$ . Assume for a contradiction that $\phi (X)\not < \phi (Y)$ . Then we may find a vector x in H that is not in the range of $(\phi (Y)-\phi (X))^{1/2}$ . Take the rank-one projection P onto ${\mathbb {C}} x$ . By Douglas’ lemma, we have $\phi (X)+cP\nleq \phi (Y)$ for all positive real numbers $c>0$ . Fix $c>0$ small enough. We have $\phi (X)+cP\in \phi (U)$ , and hence there exists an operator $Z\in U$ such that $\phi (Z)=\phi (X)+cP$ . It follows that $\phi $ restricts to an order isomorphism from $[X, Y]\cap [X, Z]\cap U$ onto $[\phi (X), \phi (X)+cP]\cap [\phi (X), \phi (Y)]\cap \phi (U) =\{\phi (X)\}$ , which is absurd. Applying the same argument to $\phi ^{-1}$ , we see that $X<Y$ if and only if $\phi (X)<\phi (Y)$ .

Let $X\in U$ . Since ${U}$ is open, there exists a positive real number $\varepsilon $ such that $[X-\varepsilon I, X+\varepsilon I]\subset {U}$ . By the preceding paragraph, we have $\phi (X-\varepsilon I)<\phi (X)<\phi (X+\varepsilon I)$ . Since $\phi ({U})$ is open, there exists a positive real number $\varepsilon '$ such that $[\phi (X)-\varepsilon ' I, \phi (X)+\varepsilon ' I]\subset \phi ({U})\cap [\phi (X-\varepsilon I), \phi (X+\varepsilon I)]$ . It follows that $\phi ^{-1}(\phi (X)-\varepsilon ' I)<X< \phi ^{-1}(\phi (X)+\varepsilon ' I)$ , $[\phi ^{-1}(\phi (X)-\varepsilon ' I), \phi ^{-1}(\phi (X)+\varepsilon ' I)]\subset {U}$ and $\phi $ restricts to an order isomorphism from $[\phi ^{-1}(\phi (X)-\varepsilon ' I), \phi ^{-1}(\phi (X)+\varepsilon ' I)]$ onto $[\phi (X)-\varepsilon ' I, \phi (X)+\varepsilon ' I]$ .▪

Let us recall a result by the second author on order isomorphisms between operator intervals. Let $f_p$ , $p < 1$ , denote a bijective monotone increasing function of the unit interval $[0,1]$ onto itself defined by

$$ \begin{align*}f_p (x) = { x \over px + 1-p}, \ \ \ x \in [0,1]. \end{align*} $$

Theorem 3.3 [Reference Šemrl10, Reference Šemrl11]

Assume that $\phi : [0,I] \to [0,I]$ is an order automorphism. Then there exist real numbers $p,q$ , $0 <p < 1$ , $q < 0$ , and a bijective linear or conjugate-linear bounded operator $T : H \to H$ with $\| T \| \le 1$ such that

(1) $$ \begin{align} \phi (X) = f_q \left( \left( f_p (TT^* ) \right) ^{-1/2} f_p (TXT^*) \left( f_p (TT^* ) \right) ^{-1/2} \right), \ \ \ X \in [0,I]. \end{align} $$

Lemma 3.4 Let $A, B, C, D\in S(H)$ be operators with $A<B$ , $C<D$ . Suppose that $\phi : [A, B]\to [C, D]$ is an order isomorphism. Then $\phi $ has an extension to a biholomorphic map on an open connected set ${\mathcal {U}}\subset B(H)$ with $\Pi (H)\subset {\mathcal {U}}$ that maps ${\Pi } (H)$ onto itself.

Proof We define order isomorphisms $\psi : [0, I]\to [A, B]$ and $\psi ': [C, D]\to [0, I]$ by $\psi (X)=(B-A)^{1/2}X(B-A)^{1/2}+A$ and $\psi '(X)=(D-C)^{-1/2}(X-C)(D-C)^{-1/2}$ . Then $\psi '\circ \phi \circ \psi : [0, I]\to [0, I]$ is an order automorphism. It suffices to prove this lemma for $\psi '\circ \phi \circ \psi $ instead of $\phi $ . Hence, we may assume $[A, B]=[C, D]=[0, I]$ .

Let $\phi $ be an order automorphism of $[0, I]$ . By Theorem 3.3, we obtain

$$ \begin{align*}\phi(X) = f_q \left( \left( f_p (TT^{\ast} ) \right) ^{-1/2} f_p (TXT^{\ast}) \left( f_p (TT^{\ast} ) \right) ^{-1/2} \right), \ \ \ X \in [0,I]. \end{align*} $$

Note that this map can be decomposed into four order isomorphisms:

$$\begin{align*}\begin{aligned} \phi_1&: [0, I]\to [0, TT^{\ast}],\,\, X\mapsto TXT^*,\\ \phi_2&: [0, TT^{\ast}]\to [0, f_p(TT^*)],\,\, X\mapsto f_p(X),\\ \phi_3&: [0, f_p(TT^*)]\to [0, I],\,\, X\mapsto \left( f_p (TT^{\ast} ) \right) ^{-1/2} X \left( f_p (TT^{\ast} ) \right) ^{-1/2},\,\,\text{and}\\ \phi_4&: [0, I]\to [0, I],\,\, X\mapsto f_q(X). \end{aligned} \end{align*}$$

It suffices to prove the statement for $\phi _j$ , $j=1, 2, 3, 4$ . It is easy to see that $\phi _3$ continuously extends to a biholomorphic automorphism of $B(H)$ that maps $\Pi (H)$ onto itself. The same holds for $\phi _1$ if T is linear. If T is conjugate-linear, then the map $X\mapsto TX^*T^*$ on $B(H)$ extends $\phi _1$ and is a biholomorphic automorphism of $B(H)$ that maps $\Pi (H)$ onto itself.

Because for every $X+iY \in \Pi (H)$ (where $X, Y\in S(H)$ ) and every $Z \in S(H)$ we have

$$ \begin{align*}(X+iY)^{-1} = Y^{-1/2} ( Y^{-1/2} X Y^{-1/2} + iI)^{-1} Y^{-1/2} \end{align*} $$

and

$$ \begin{align*}(iI + Z)^{-1} = (I + Z^2)^{-1/2} (Z - iI) (I + Z^2)^{-1/2}, \end{align*} $$

the map $X \mapsto -X^{-1}$ is a biholomorphic automorphism of $\Pi (H)$ . Let r be a real number $<1$ , $r\not =0$ . Using

(2) $$ \begin{align} f_r (x) = {1 \over r} - {1 - r \over r^2} \left( {1-r \over r} + x \right)^{-1} \end{align} $$

and

$$ \begin{align*}f_{r}^{-1} = f_{r \over r-1}, \end{align*} $$

we see that $f_r$ extends to a biholomorphic map $X\mapsto f_r(X)$ from $\{X\in B(H)\, : \, 1- 1/r\notin \sigma (X)\}$ onto $\{X\in B(H)\, : \, 1/r\notin \sigma (X)\}$ . Since the map $X\mapsto -X^{-1}$ maps $\Pi (H)$ onto itself, we finally conclude that the map $X \mapsto f_r (X)$ is a biholomorphic automorphism of $\Pi (H)$ .▪

Let us prove that the first condition of the main theorem implies the second one.

Proposition 3.5 Let $U\subset S(H)$ be an operator domain, and let $\phi : U\to S(H)$ be a local order isomorphism. Then $\phi $ has a unique continuous extension to $U\cup \Pi (H)$ that maps ${\Pi } (H)$ biholomorphically onto itself.

Proof By Lemma 3.2, for each $X\in U$ , there exist operators $A_X<X<B_X$ , $[A_X, B_X]\subset U$ , $\phi (A_X)<\phi (X)<\phi (B_X)$ , $[\phi (A_X), \phi (B_X)]\subset \phi (U)$ such that $\phi ([A_X, B_X])=[\phi (A_X), \phi (B_X)]$ and $\phi : [A_X, B_X]\to [\phi (A_X), \phi (B_X)]$ is an order isomorphism. By Lemma 3.4, $\phi $ restricted to $[A_X, B_X]$ extends to a biholomorphic map $\phi _X$ defined on some open subset of $B(H)$ containing $[A_X, B_X]\cup \Pi (H)$ which maps $[A_X, B_X]$ bijectively onto $[\phi (A_X), \phi (B_X)]$ and $\Pi (H)$ biholomorphically onto itself. Let $X, Y\in U$ . Suppose that there exist $A, B\in U$ with $A<B$ and $[A, B]\subset [A_X, B_X]\cap [A_Y, B_Y]$ . By Proposition 3.1, we have $\phi _X(Z)=\phi _Y(Z)$ , $Z\in \Pi (H)$ . Since U is an operator domain, it is path-connected. Therefore, a compactness argument implies that $\phi _X(Z)=\phi _Y(Z)$ , $Z\in \Pi (H)$ , holds for any $X, Y\in U$ . Hence, we obtain the desired conclusion.▪

4 Explicit formulae

In what follows, we fix an orthonormal basis $\{ e_{\alpha } \, : \, \alpha \in J \}$ of H. For $X\in B(H)$ , let $X^t$ denote the transpose of X with respect to this orthonormal basis. More precisely, $X^t$ is the unique bounded linear operator acting on H such that

$$ \begin{align*}\langle X^t e_{\alpha} , e_{\beta} \rangle = \langle X e_{\beta} , e_{\alpha} \rangle, \ \ \ \alpha, \beta \in J. \end{align*} $$

We first give a concrete formula for biholomorphic automorphisms of $\Pi (H)$ , which might be known among specialists. We give its proof for completeness.

Proposition 4.1 A map $\phi : {\Pi } (H) \to {\Pi } (H)$ is a biholomorphic automorphism if and only if there exist a bounded linear bijection $T : H \to H$ and $A,B,C \in S(H)$ such that either

$$\begin{align*}\begin{aligned} \phi (X) &= T((X-B)^{-1} + A)^{-1} T^{\ast} +C,\quad X \in {\Pi} (H), \text{ or}\\ \phi (X) &= T((X^t-B)^{-1} + A)^{-1} T^{\ast} +C,\quad X \in {\Pi} (H). \end{aligned} \end{align*}$$

Moreover, if $\phi : {\Pi } (H) \to {\Pi } (H)$ is a biholomorphic automorphism and there exists a sequence $(X_n)\subset \Pi (H)$ with $X_n\to 0$ and $\phi (X_n)\to 0$ as $n\to \infty $ , then there exist a bounded linear bijection $T : H \to H$ and an operator $A \in S(H)$ such that either

$$\begin{align*}\begin{aligned} \phi (X) &= T(X^{-1} + A)^{-1} T^{\ast},\quad X \in {\Pi} (H), \text{ or}\\ \phi (X) &= T((X^t)^{-1} + A)^{-1} T^{\ast},\quad X \in {\Pi} (H). \end{aligned} \end{align*}$$

Proof We refer to [Reference Harris3]. Recall that the open unit ball $B(H)_0$ of $B(H)$ is biholomorphically equivalent to ${\Pi } (H)$ through the Cayley transform $\Psi : Y\mapsto i(Y+I)(I-Y)^{-1}$ . The inverse is $X\mapsto (X-iI)(X+iI)^{-1}$ . See Theorem 12 of [Reference Harris3] with $\mathfrak {A}=B(H)$ and $V=I$ .

It is easy to see that if $A, B, C, T$ are as in the statement, then

$$ \begin{align*}X\mapsto T((X-B)^{-1}+A)^{-1}T^{\ast} +C \end{align*} $$

and

$$ \begin{align*}X\mapsto T((X^t-B)^{-1}+A)^{-1}T^{\ast} +C \end{align*} $$

are biholomorphic automorphisms of ${\Pi } (H)$ . Indeed, it is the composition of five biholomorphic automorphisms $X\mapsto X-B$ (or $X\mapsto X^t-B$ ), $X\mapsto -X^{-1}$ , $X\mapsto X-A$ , $X\mapsto -X^{-1}$ , and $X\mapsto TXT^{\ast } +C$ of $\Pi (H)$ .

Let $\phi $ be a biholomorphic automorphism of $\Pi (H)$ . We know that the map $\psi :=\Psi ^{-1}\circ \phi \circ \Psi $ is a biholomorphic automorphism of $B(H)_0$ . By [Reference Harris3, Theorems 2 and 3], $\psi $ extends (uniquely) to a homeomorphism from the closed unit ball of $B(H)$ onto itself, and moreover, such an extension maps the unitary group of H onto itself (see equation (12) of [Reference Harris3] and the formula that appears two lines above this equation). Since $\Psi ^{-1}$ (has a continuous extension that) maps $S(H)$ onto the collection

$$ \begin{align*}\{u \,:\, u\text{ is a unitary operator of }H \text{ such that }u-1\text{ is invertible}\}, \end{align*} $$

which is a dense open subset of the unitary group, we see that there exists a dense open subset $U\subset S(H)$ such that $\phi = \Psi \circ \psi \circ \Psi ^{-1}$ has a continuous extension to $\Pi (H)\cup U$ that maps U into $S(H)$ . Fix an element $X_0\in U$ . Define a biholomorphic map $\tilde {\phi }$ of $\Pi (H)$ by $\tilde {\phi }(X) = \phi (X+X_0) -\lim _{0<c\to 0}\phi (icI+X_0)$ . Then $\tilde {\phi }$ has a continuous extension to $\Pi (H)\cup \{0\}$ and $\lim _{0<c\to 0}\tilde {\phi }(icI)=0$ . Therefore, in order to complete the proof, it suffices to show the latter half of the statement of the proposition.

Let $\phi $ be a biholomorphic automorphism of $\Pi (H)$ , and suppose that there exists a sequence $(X_n)\subset \Pi (H)$ with $X_n\to 0$ and $\phi (X_n)\to 0$ . Take operators $A_1, A_2\in S(H)$ with $\phi (iI)=A_1+iA_2$ . Then $A_2>0$ . Consider the map f defined by $f(X) = T(X^{-1}+A)^{-1}T^{\ast }$ , $X\in \Pi (H)$ , where

$$ \begin{align*} A=A_2^{-1/2}A_1A_2^{-1/2},\quad T= A_2^{1/2}(A^2+I)^{1/2}. \end{align*} $$

A straightforward calculation shows that $f(iI)=\phi (iI)$ and $f^{-1}\circ \phi (X_n)\to 0$ as $n\to \infty $ . Consider biholomorphic automorphisms $\psi =\Psi ^{-1}\circ \phi \circ \Psi $ and $g=\Psi ^{-1}\circ f\circ \Psi $ of $B(H)_0$ . Since $f(iI)=\phi (iI)$ , we obtain $g^{-1}\circ \psi (0)= 0$ . By [Reference Harris3, Theorem 1] and [Reference Molnár8, Theorem A.9], there exists a pair of unitaries $u, v$ with either $g^{-1}\circ \psi (Y)= uYv$ , $Y\in B(H)_0$ , or $g^{-1}\circ \psi (Y)= uY^tv$ , $Y\in B(H)_0$ . Moreover, we see that $\Psi ^{-1}(X_n)\to -I$ and

$$ \begin{align*}g^{-1}\circ \psi (\Psi^{-1}(X_n))= \Psi^{-1}\circ f^{-1}\circ \phi (X_n) \to -I \end{align*} $$

as $n\to \infty $ . Hence, we obtain $-I = -uv$ , or equivalently, $v=u^{\ast }$ . Thus, we have either $\psi (Y) = g(uYu^{\ast })$ , $Y\in B(H)_0$ , or $\psi (Y) = g(uY^tu^{\ast })$ , $Y\in B(H)_0$ . Since $\Psi ^{-1}$ is given by functional calculus, we obtain

$$\begin{align*}\begin{aligned} \phi(X) &=\Psi\circ \psi(\Psi^{-1}(X))\\ &= \Psi\circ g(u\Psi^{-1}(X)u^*)\\ &= \Psi\circ g\circ \Psi^{-1}(uXu^*)\\ &= f(uXu^{\ast}) \\ &= T((uXu^{\ast})^{-1}+A)^{-1}T^{\ast} \\ &= Tu(X^{-1}+u^{\ast} Au)^{-1}(Tu)^{\ast},\quad X\in \Pi(H), \end{aligned} \end{align*}$$

in the former case, and similarly

$$ \begin{align*}\phi(X)= Tu((X^t)^{-1}+u^{\ast} Au)^{-1}(Tu)^{\ast},\quad X\in \Pi(H), \end{align*} $$

in the latter case. This completes the proof.▪

Let $U\subset S(H)$ be an operator domain, and let $\phi : U \to S(H)$ satisfy the second condition of the main theorem. Hence, $\phi : U \cup \Pi (H) \to B(H)$ is continuous and restricts to a biholomorphic automorphism of $\Pi (H)$ . We will show that then the third condition of the main result is satisfied, which completes the proof of Theorem 1.1. Fix an operator $X_0\in U$ . Considering the map $X\mapsto \phi (X+X_0)-\phi (X_0)$ instead of $\phi $ , we may assume $0 \in U$ and $\phi (0)=0$ .

By Proposition 4.1, we have either

$$\begin{align*}\begin{aligned} \phi(X) &= T(X^{-1} + A)^{-1}T^{\ast},\quad X\in {\Pi} (H), \text{ or}\\ \phi(X) &= T((X^t)^{-1} + A)^{-1}T^{\ast},\quad X\in {\Pi} (H), \end{aligned} \end{align*}$$

where $A\in S(H)$ and $T : H\to H$ is a bounded linear bijection. Recall that the maps $X\mapsto X^t$ and $X\mapsto T^{-1}X(T^{\ast })^{-1}$ are biholomorphic automorphisms of $B(H)$ that map $\Pi (H)$ onto itself, $\Pi (H)^*$ onto itself, and restrict to order automorphisms of $S(H)$ . Composing the map $\phi $ with $X\mapsto X^t$ , if necessary, and $X\mapsto T^{-1}X (T^{\ast })^{-1}$ , we may assume with no loss of generality that $\phi $ is of the form

$$\begin{align*}\begin{aligned} \phi(X) &= (X^{-1} + A)^{-1}\\ &=(X^{-1}(I+XA))^{-1}\\ &= (XA+I)^{-1}X,\quad X\in {\Pi} (H). \end{aligned} \end{align*}$$

We define

$$\begin{align*}W_A := \{ X\in B(H)\, : \, XA+I \mathrm{\ \, is\ \, invertible}\} = \{ X\in B(H)\, : \, AX+I \mathrm{\ \, is\ \, invertible}\}, \end{align*}$$

which is an open subset of $B(H)$ containing both the generalized upper half-plane and the generalized lower half-plane. We further define a map $\Theta _A : W_A\to B(H)$ by $\Theta _A(X) = (XA+I)^{-1}X$ . Note that

$$\begin{align*}\begin{aligned} \Theta_A(X)&= (XA+I)^{-1}X \\ &= (XA+I)^{-1}X(AX+I)(AX+I)^{-1}\\ &= (XA+I)^{-1}(XA+I)X(AX+I)^{-1}\\ &=X(AX+I)^{-1}. \end{aligned} \end{align*}$$

Lemma 4.2 Suppose that a sequence $(X_n)\subset W_A$ converges to an operator $X\in B(H)\setminus W_A$ . Then we have $\|\Theta _A(X_n)\|\to \infty $ .

Proof The assumption implies $\| (X_nA+I)^{-1}\|\to \infty $ as $n\to \infty $ . Hence,

$$\begin{align*}\begin{aligned} \|\Theta_A(X_n)\|\|A\|&=\|(X_nA+I)^{-1}X_n\|\|A\|\\ &\ge \|(X_nA+I)^{-1}X_nA\| = \|I- (X_nA+I)^{-1}\|\to\infty, \end{aligned} \end{align*}$$

which completes the proof.▪

Because $\phi $ is continuous on $U \cup \Pi (H)$ and $\Pi (H) \subset W_A$ , the above lemma yields that $U \subset W_A$ .

Lemma 4.3 The map $\Theta _A$ is a biholomorphic map from $W_A$ onto $W_{-A}$ , and $(\Theta _A)^{-1}= \Theta _{-A}$ .

Proof Let $X\in W_A$ . Then,

$$ \begin{align*}-A\Theta_A(X) +I = -AX(AX+I)^{-1} +(AX+I)(AX+I)^{-1} = (AX+I)^{-1}. \end{align*} $$

It follows $\Theta _A(X)\in W_{-A}$ and

$$ \begin{align*}\Theta_{-A}\circ \Theta_{A} (X) = \Theta_{A}(X) (-A\Theta_A(X) +I)^{-1} = X(AX+I)^{-1}(AX+I) = X. \end{align*} $$

Thus, we have $\Theta _{-A}\circ \Theta _A = \operatorname {id}_{W_A}$ . Similarly, we can prove $\Theta _A\circ \Theta _{-A} = \operatorname {id}_{W_{-A}}$ . Hence, we obtain $(\Theta _A)^{-1}= \Theta _{-A}$ . In order to see that $\Theta _A$ is biholomorphic, it suffices to show that $\Theta _A$ is holomorphic. This is easily seen by the fact that the maps $X\mapsto X$ and $X\mapsto (XA+I)^{-1}$ are holomorphic on $W_A$ .▪

The proof of the main theorem is almost complete. It remains only to take ${\mathcal {U}}$ to be the connected component of $W_A$ that contains the zero operator and similarly, to denote by ${\mathcal {V}}$ the connected component of $W_{-A}$ that contains $0$ (we do not know whether there exists $A \in S(H)$ such that $W_A$ is not connected, but this does not matter here). Since clearly $\phi ({\mathcal {U}} ) = {\mathcal {V}}$ , we are done.

Moreover, the main theorem combined with the above discussion shows that by considering the map $\Theta _A$ and its restriction $\hat {\Phi }_A$ to $\hat {U}_A := S(H)\cap W_A$ , we can get the full understanding of the structure of local order isomorphisms. We have $\hat {\Phi }_A(X) = (XA+I)^{-1}X=X(AX+I)^{-1}=(\hat {\Phi }_A(X))^{\ast }$ , $X\in \hat {U}_A$ . Note that $\hat {U}_A$ is open in $S(H)$ and $0\in \hat {U}_A$ . Take the connected component $U_A\ni 0$ of $\hat {U}_A$ in $S(H)$ . We also consider the restriction $\Phi _A$ of $\hat {\Phi }_A$ to $U_A$ .

It is easy to see that:

  • the map $\hat {\Phi }_A$ is a bijection from $\hat {U}_A$ onto $\hat {U}_{-A}$ , and $(\hat {\Phi }_A)^{-1}= \hat {\Phi }_{-A}$ ,

  • the map $\Phi _A$ is a bijection from $U_A$ onto $U_{-A}$ , and $(\Phi _A)^{-1}= \Phi _{-A}$ , and

  • $U\subset U_A$ .

Let us summarize what we have obtained so far.

Theorem 4.4 Let $U\subset S(H)$ be an operator domain with $0\in U$ . Suppose that $\phi : U\to S(H)$ is a local order isomorphism with $\phi (0)=0$ . Then there exist $A\in S(H)$ and an invertible operator $T\in B(H)$ such that either

  • for any $X\in U$ , we have $X\in U_A$ and

    $$ \begin{align*}\phi(X) = T\Phi_A(X)T^{\ast} = T(XA+I)^{-1}XT^{\ast}, \text{ or} \end{align*} $$
  • for any $X\in U$ , we have $X^t\in U_A$ and

    $$ \begin{align*}\phi(X) = T\Phi_A(X^t)T^{\ast} = T(X^tA+I)^{-1}X^tT^{\ast}. \end{align*} $$

Moreover, $\Phi _A : U_A\to U_{-A}$ extends to a biholomorphic map $\Theta _A: W_A\to W_{-A}$ that maps $\Pi (H)$ onto itself.

We continue with a uniqueness result.

Proposition 4.5 Let $A, A'\in S(H)$ and $T, T'\in B(H)$ . Suppose that T and $T'$ are invertible.

  1. 1. If

    $$ \begin{align*}T(XA+I)^{-1}XT^{\ast}= T'(XA'+I)^{-1}X(T')^{\ast} \end{align*} $$
    holds for every X in some nonempty open subset of $U_A\cap U_{A'}$ , then $A=A'$ and there exists a complex number $\lambda \in {\mathbb {C}}$ with $|\lambda |=1$ such that $T = \lambda T'$ .
  2. 2. The equation

    $$ \begin{align*}T(XA+I)^{-1}XT^{\ast}= T'(X^tA'+I)^{-1}X^t(T')^{\ast} \end{align*} $$
    cannot hold for every X in any nonempty open subset of $U_A\cap \{Y^t\, :\, Y\in U_{A'}\}$ .

Proof Assume that the equation holds for some nonempty open set. By Proposition 3.1, the same equation holds for any $X\in \Pi (H)$ . After an easy calculation, we obtain

$$ \begin{align*}A+X^{-1}= ((T')^{-1}T)^{\ast}(A'+X^{-1})(T')^{-1}T,\quad X\in \Pi(H) \end{align*} $$

in (1) and

$$ \begin{align*}A+X^{-1}= ((T')^{-1}T)^{\ast}(A'+(X^t)^{-1})(T')^{-1}T,\quad X\in \Pi(H) \end{align*} $$

in (2). The rest of the proof is easy and is left to the reader.▪

We may apply Theorem 4.4 to obtain previously known results. As an example, we give the structure of order automorphisms of $S(H)$ first given by Molnár. Further application of our results can be found in Section 7.

Theorem 4.6 [Reference Molnár7]

Let $\phi : S(H)\to S(H)$ be an order automorphism. Then there exist $B\in S(H)$ and a bounded bijective linear operator $T: H\to H$ such that either

$$\begin{align*}\begin{aligned} \phi(X) &= TXT^{\ast} +B, \ \ \ X\in S(H), \text{ or}\\ \phi(X) &= TX^tT^{\ast} +B, \ \ \ X\in S(H). \end{aligned} \end{align*}$$

Proof It suffices to consider the case $\phi (0)=0$ . It is clear that $\phi $ is a local order isomorphism. By Theorem 4.4, there exist $A\in S(H)$ and a bounded bijective linear operator $T: H\to H$ such that $S(H)\subset U_A$ and either

$$\begin{align*}\begin{aligned} \phi(X) &= T\Phi_A(X)T^{\ast} = T(XA+I)^{-1}XT^{\ast}, \ \ \ X\in S(H), \text{ or}\\ \phi(X) &= T\Phi_A(X^t)T^{\ast} = T(X^t A+I)^{-1}X^t T^{\ast}, \ \ \ X\in S(H). \end{aligned} \end{align*}$$

Clearly, the condition $S(H)\subset U_A$ implies $A=0$ , and hence we obtain the desired conclusion.▪

Recall that $X^t$ denotes the transpose with respect to some orthonormal basis $\{ e_{\alpha } \, : \, \alpha \in J \}$ fixed in advance. Denote by $K : H \to H$ the conjugate-linear bijection given by $K \left ( \sum _{\alpha \in J} \lambda _{\alpha } e_{\alpha } \right ) = \sum _{\alpha \in J} \overline {\lambda _{\alpha }} e_{\alpha }$ . Then it is easy to see that $X^t = KX^{\ast } K$ for every $X \in B(H)$ . Hence, if $T\in B(H)$ is invertible and we set $S = TK$ , then S is a conjugate-linear bijective bounded operator on H and $TX^t T^{\ast } = SX^{\ast } S^{\ast }$ , $X \in B(H)$ . The map $X \mapsto SX^{\ast } S^{\ast }$ is a biholomorphic automorphism of $B(H)$ , but neither of the maps $X \mapsto X^{\ast }$ and $X \mapsto SXS^{\ast }$ is holomorphic (because they are conjugate-linear). As long as we were working with biholomorphic maps, it was more convenient to write $X \mapsto TX^t T^{\ast }$ rather than $X\mapsto SX^{\ast } S^{\ast }$ , since in the first form we have the composition of two biholomorphic automorphisms $X \mapsto X^t$ and $X \mapsto TXT^{\ast }$ . Once we restrict our attention to operator domains in $S(H)$ and we are interested in (local) order isomorphisms, the second form is more appropriate because then $X = X^{\ast }$ . In particular, the conclusion of the last theorem may be reformulated as follows: there exist $B\in S(H)$ and a bounded bijective linear or conjugate-linear operator $T: H\to H$ such that $ \phi (X) = TXT^{\ast } +B$ for every $X \in S(H)$ . The corresponding reformulation of Theorem 4.4 is left to the reader.

5 Properties of local order isomorphisms

The aim of this section is to obtain a further understanding of the structure of local order isomorphisms on operator domains.

First, we define maximality and an equivalence relation in the collection of all local order isomorphisms. Let $U\subset S(H)$ be an operator domain and $\phi : U\to S(H)$ a local order isomorphism. We say $\phi $ is maximal if there does not exist an extension of $\phi $ to a local order isomorphism on an operator domain $V\subset S(H)$ with $U\subset V$ and $U\neq V$ . Let $U'\subset S(H)$ be another operator domain and $\phi : U\to S(H)$ , $\phi ' : U'\to S(H)$ two local order isomorphisms. We say $\phi $ and $\phi '$ are equivalent if there exist order automorphisms $\psi _1, \psi _2$ of $S(H)$ such that $\phi '= \psi _2\circ \phi \circ \psi _1$ . Having in mind the general form of order automorphisms of $S(H)$ (Theorem 4.6), it is clear that maximality is stable by equivalence.

In the first half of the current section, we examine the equivalence relation of local order isomorphisms. By Lemma 4.2, the local order isomorphism $\Phi _A : U_A\to S(H)$ is maximal. An easy application of results in the preceding sections gives the following.

Proposition 5.1 Let $U\subset S(H)$ be an operator domain, and let $\phi : U\to S(H)$ be a local order isomorphism.

  1. 1. There exist $A\in S(H)$ and an operator domain $V\subset U_A$ such that the restriction of $\Phi _A$ to V is equivalent to $\phi $ .

  2. 2. The map $\phi : U\to S(H)$ uniquely extends to a maximal local order isomorphism.

In particular, a maximal local order isomorphism is equivalent to $\Phi _A : U_A\to S(H)$ for some $A\in S(H)$ .

Proposition 5.2 Let $A\in S(H)$ . Let $T: H\to H$ be a bounded linear or conjugate-linear bijection. Then, $\Phi _A$ is equivalent to $\Phi _{TAT^{\ast }}$ . More precisely, we have the following: let $\psi $ be an order automorphism of $S(H)$ given by $\psi (X) = T^*XT$ , $X\in S(H)$ . Then $\Phi _{TAT^{\ast }}= \psi ^{-1}\circ \Phi _A\circ \psi $ .

Proof Put $B=TAT^{\ast }$ . Let $X\in S(H)$ . We have $X\in \hat {U}_{B}$ if and only if $XTAT^{\ast }+I$ is invertible. On the other hand, we have $\psi (X)\in \hat {U}_A$ if and only if $T^{\ast } XTA +I$ is invertible. Hence, we obtain $X\in U_{B}$ if and only if $\psi (X)\in U_A$ . Let $X\in U_{B}$ . Then,

$$\begin{align*}\Phi_A\circ \psi (X) = T^*XT (AT^*XT +I)^{-1}, \end{align*}$$

and hence

$$\begin{align*}\begin{aligned} \psi^{-1}\circ \Phi_A\circ \psi (X) &=(T^*)^{-1}T^*XT (AT^*XT +I)^{-1}T^{-1}\\ &=X(TAT^*X+I)^{-1} = \Phi_{B}(X).\\[-24pt] \end{aligned} \end{align*}$$

Proposition 5.2 gives examples of mutually equivalent local order isomorphisms. In Proposition 5.5, we will show that every pair of mutually equivalent local order isomorphisms arises in that way.

Lemma 5.3 Let $A\in S(H)$ and $X\in U_A$ . Then there exists a bounded linear bijection $T\in B(H)$ such that $\hat {\Phi }_X(A) = TAT^*$ .

Proof Since $0, X\in U_A$ and $U_A$ is path-connected, there exists a continuous path $\tau : [0, 1]\to U_A$ such that $\tau (0)=0$ and $\tau (1)=X$ . We may take $0= t_0<t_1<\cdots <t_k=1$ such that $\lVert (\tau (t_{j-1})A+I)(\tau (t_j)A+I)^{-1} -I\rVert $ is sufficiently small for $j=1, \ldots , k$ . It suffices to show that there exists a bounded linear bijection $T_j: H\to H$ such that $A(\tau (t_j)A+I)^{-1} = T_jA(\tau (t_{j-1})A+I)^{-1}T_j^*$ , $j\in \{1, \ldots , k\}$ . For this, consider the biholomorphic function $f: \{z\in {\mathbb {C}} \,:\, \operatorname {Re}z>0\}\to {\mathbb {C}}\setminus (-\infty , 0]$ defined by $f(z)=z^2$ . Then the equations $f^{-1}(z) = \overline {f^{-1}(\bar {z})}$ and

$$ \begin{align*}A(\tau(t_{j-1})A+I)^{-1} \left((\tau(t_{j-1})A+I)(\tau(t_j)A+I)^{-1}\right)\end{align*} $$
$$ \begin{align*}= \left((\tau(t_{j-1})A+I)(\tau(t_j)A+I)^{-1}\right)^* A(\tau(t_{j-1})A+I)^{-1} \end{align*} $$

imply that

$$\begin{align*}\begin{aligned} &A(\tau(t_{j})A+I)^{-1}\\ &= A(\tau(t_{j-1})A+I)^{-1} \left(f^{-1}\left((\tau(t_{j-1})A+I)(\tau(t_j)A+I)^{-1}\right)\right)^{2}\\ &= S^* A(\tau(t_{j-1})A+I)^{-1} S, \end{aligned} \end{align*}$$

where $S = f^{-1}\left ( (\tau (t_{j-1})A+I)(\tau (t_j)A+I)^{-1}\right )$ .▪

Proposition 5.4 Let $X_0, A\in S(H)$ satisfy $X_0\in \hat {U}_A$ (or equivalently, $A\in \hat {U}_{X_0}$ ) and put $B=\hat {\Phi }_{X_0}(A)$ . Then, for $X\in S(H)$ , we have $X+X_0\in \hat {U}_A$ if and only if $X\in \hat {U}_{B}$ . Moreover, if these equivalent conditions hold, then

$$\begin{align*}\hat{\Phi}_A(X+X_0) = (X_0A+I)^{-1} \hat{\Phi}_{B}(X)(AX_0+I)^{-1} + \hat{\Phi}_A(X_0). \end{align*}$$

Proof The condition $X+X_0\in \hat {U}_A$ means $(X+X_0)A+I$ is invertible. The condition $X\in \hat {U}_{B}$ means

$$ \begin{align*}XB+I=XA(X_0A+I)^{-1} +I = (XA+X_0A+I)(X_0A+I)^{-1} \end{align*} $$

is invertible. Hence, they are equivalent. Suppose that these equivalent conditions hold. Then we obtain

$$\begin{align*}\begin{aligned} &(X_0A+I)^{-1}\hat{\Phi}_{B}(X)(AX_0+I)^{-1} + \hat{\Phi}_A(X_0)\\ &= (X_0A+I)^{-1}\left(X(BX+I)^{-1}\right)(AX_0+I)^{-1} + (X_0A+I)^{-1}X_0\\ &= (X_0A+I)^{-1}\left(X((AX_0+I)^{-1}AX+I)^{-1}\right)(AX_0+I)^{-1} + (X_0A+I)^{-1}X_0\\ &= (X_0A+I)^{-1}X(AX+AX_0+I)^{-1} + (X_0A+I)^{-1}X_0\\ &= (X_0A+I)^{-1}(X+X_0AX+X_0AX_0+X_0) (AX+AX_0+I)^{-1}\\ &= (X+X_0)(A(X+X_0)+I)^{-1} = \hat{\Phi}_A(X+X_0).\\[-17pt] \end{aligned} \end{align*}$$

If in the above proposition we replace the assumption $X_0\in \hat {U}_A$ by a stronger one $X_0\in U_A$ , then using the fact that $X \mapsto X+X_0$ is a homeomorphism of $\hat {U}_B$ onto $\hat {U}_A$ , we conclude that $X+X_0\in U_A$ if and only if $X\in U_{B}$ and in this case we have

$$\begin{align*}{\Phi}_A(X+X_0) = (X_0A+I)^{-1} {\Phi}_{B}(X)(AX_0+I)^{-1} + {\Phi}_A(X_0). \end{align*}$$

Proposition 5.5 Let $A, B\in S(H)$ . Suppose that $U\subset U_A$ , $V\subset U_B$ are operator domains. Let $\phi $ (resp. $\psi $ ) denote the restriction of $\Phi _A$ to U (resp. $\Phi _B$ to V). If $\phi $ is equivalent to $\psi $ , then there exists a bounded linear or conjugate-linear bijection $T\in B(H)$ such that $B=TAT^{\ast }$ .

Proof There exist order automorphisms $\psi _1, \psi _2: S(H)\to S(H)$ such that $\psi = \psi _2\circ \phi \circ \psi _1$ . Considering extensions to maximal local order isomorphisms of both sides, we obtain $\Phi _B = \psi _2\circ \Phi _A\circ \psi _1$ . In particular, for $X\in S(H)$ , we have $X\in U_B$ if and only if $\psi _1(X)\in U_A$ .

By Theorem 4.6, there exist bounded linear or conjugate-linear bijections $T_1, T_2: H\to H$ and $C_1, C_2\in S(H)$ such that

$$ \begin{align*}\psi_1(X)= T_1XT_1^* +C_1,\quad\psi_2(X) = T_2XT_2^* + C_2,\quad X\in S(H). \end{align*} $$

Put $D:= \hat {\Phi }_{C_1}(A) = A(C_1A+I)^{-1}$ . Let $X \in U_B$ . By Lemma 5.4, we have

$$\begin{align*}\begin{aligned} \Phi_B(X)&= \psi_2\circ\Phi_A\circ\psi_1(X) \\ &= \psi_2\circ\Phi_A(T_1XT_1^* +C_1) \\ &= \psi_2\left((C_1A+I)^{-1}\Phi_D(T_1XT_1^*)(AC_1+I)^{-1} +\Phi_A(C_1)\right) \\ &= T_2(C_1A+I)^{-1}\Phi_D(T_1XT_1^*)(AC_1+I)^{-1}T_2^* +T_2\Phi_A(C_1)T_2^* + C_2. \end{aligned} \end{align*}$$

Since $\Phi _{B}(0)=0$ , we obtain $T_2\Phi _A(C_1)T_2^* + C_2=0$ . By Lemma 5.2, we obtain

$$\begin{align*}\begin{aligned} \Phi_{B} (X) &= T_2(C_1A+I)^{-1}\Phi_D(T_1XT_1^*)(AC_1+I)^{-1}T_2^* \\ &= T_2(C_1A+I)^{-1}T_1\Phi_{T_1^*DT_1}(X)T_1^*(AC_1+I)^{-1}T_2^*. \end{aligned} \end{align*}$$

Proposition 4.5 implies $B=T_1^*DT_1=T_1^*A(C_1A+I)^{-1}T_1$ . Since $C_1=\psi _1(0)\in U_A$ , Lemma 5.3 implies that there exists a bounded linear or conjugate-linear bijection $T\in B(H)$ with $B=TAT^*$ .▪

As a consequence of Propositions 5.2 and 5.5, we obtain the following corollary.

Corollary 5.6 Let $A, B\in S(H)$ . Two maximal order isomorphisms $\Phi _A$ and $\Phi _B$ are equivalent if and only if there exists a bounded linear or conjugate-linear bijection $T: H\to H$ such that $B=TAT^*$ . If $2\le n=\dim H<\infty $ , then the number of equivalence classes of maximal local order isomorphisms is $(n+2)(n+1)/2$ .

Proof The former half is clear. In the matrix language, it can be reformulated as follows: $\Phi _A$ and $\Phi _B$ are equivalent if and only if there exists an invertible $n \times n$ complex matrix T such that $A = TBT^{\ast }$ or $A = TB^t T^{\ast }$ . Since hermitian matrices B and $B^t$ have the same eigenvalues, they are unitarily similar. Consequently, $\Phi _A$ and $\Phi _B$ are equivalent if and only if there exists an invertible $n \times n$ complex matrix T such that $A = TBT^{\ast }$ . By Sylvester’s law of inertia, this is equivalent to the condition that the number of positive eigenvalues of A and B coincide and the same is true for the number of negative eigenvalues (here, each eigenvalue is counted with its multiplicity). By Proposition 5.1, the number of equivalence classes of maximal order isomorphisms of matrix domains in $S_n$ is $(n+2)(n+1)/2$ .▪

It is clear that an order isomorphism between two operator domains is a local order isomorphism. The converse does not hold. However, we know that the maximal local order isomorphism $X\mapsto -X^{-1}$ , from the operator interval $(0, \infty )$ onto $(-\infty , 0)$ , is an order isomorphism. In the second half of this section, we consider the following question: When is a local order isomorphism an order isomorphism? By Proposition 5.1, it suffices to consider a restriction of the map $\Phi _A: {U}_A\to {U}_{-A}$ to an operator domain $U\subset U_A$ . The question above is related to the so-called McCarthy’s Champagne Conjecture asserting that locally monotone functions in two variables that extend analytically should be globally monotone. The problem was partially solved in [Reference Agler, McCarthy and Young1] and has attracted a lot of attention recently.

Proposition 5.7 Let $A\in {S}(H)$ . Suppose that $X\in U_A$ satisfies $X\ge 0$ . Then the condition $[0, X]\subset {{U}}_A$ is equivalent to $X^{1/2}AX^{1/2}\ge -I$ . Moreover, if these equivalent conditions hold, then $\Phi _A$ restricts to an order isomorphism from $[0, X]$ onto $[0, \Phi _A(X)]$ .

Proof Since $X\in U_A$ , we have $-1\notin \sigma (XA)\setminus \{0\} = \sigma (X^{1/2}AX^{1/2})\setminus \{0\}$ . If $X^{1/2}AX^{1/2}\ngeq -I$ , then there exists a positive real number c such that $0<c< 1$ and $-1\in \sigma ((cX)^{1/2}A(cX)^{1/2})$ . We know that $-1\in \sigma ((cX)^{1/2}A(cX)^{1/2})$ if and only if $cXA+I$ is noninvertible, and thus $cX\notin {{U}}_A$ . If $X^{1/2}AX^{1/2}\ge -I$ , then we actually have $X^{1/2}AX^{1/2}> -I$ . It follows that $-I< TX^{1/2}AX^{1/2}T^*$ for any contractive operator T on H, i.e., for any $T\in B(H)$ with $\|T\|\le 1$ . Indeed, there exists a positive real number $0<\varepsilon \le 1$ such that

$$ \begin{align*}\langle TX^{1/2}AX^{1/2}T^* x, x\rangle = \langle X^{1/2}AX^{1/2}(T^*x), T^*x\rangle \geq -(1-\varepsilon) \lVert T^* x\rVert^2\geq -(1-\varepsilon) \end{align*} $$

for any unit vector $x\in H$ . If $Y\in [0, X]$ , then by Douglas’ lemma there exists a contractive operator $T\in B(H)$ such that $Y^{1/2}= TX^{1/2}= X^{1/2}T^*$ . We have $-I<TX^{1/2}AX^{1/2}T^* = Y^{1/2}AY^{1/2}$ , and hence $\sigma (Y^{1/2}AY^{1/2})\cap (-\infty , -1]= \emptyset $ , and $AY+I$ is invertible.

Suppose that $[0, X]\subset {{U}}_A$ . Theorem 2.2 implies $\Phi _A(X)\ge \Phi _A(0)=0$ . We have $-\Phi _A(X)A = f(XA)$ , where f is a biholomorphic function defined by

$$\begin{align*}f(z) = -\frac{z}{z+1} \end{align*}$$

on ${\mathbb {C}}\setminus \{-1\}$ . Since $\sigma (XA)\subset \sigma (X^{1/2}AX^{1/2})\cup \{0\}\subset (-1, \infty )$ , the spectral mapping theorem implies $\sigma (-\Phi _A(X)A) = f(\sigma (XA)) \subset (-1, \infty )$ . Thus, we obtain $[0, \Phi _A(X)]\subset U_{-A}$ . Since $(\Phi _A)^{-1}=\Phi _{-A}$ , Theorem 2.2 implies that $\Phi _A$ restricts to an order isomorphism from $[0, X]$ onto $[0, \Phi _A(X)]$ .▪

Proposition 5.8 Let $U\subset U_A$ be an operator domain. Then the map $\Phi _A$ restricts to an order preserving map on U if and only if the following condition holds: for any pair $X, Y\in U$ with $X\le Y$ , $[X, Y]\subset U_A$ holds.

Proof Theorem 2.2 gives one direction. Suppose that there exist a pair $X, Y\in U$ with $X\le Y$ , $[X, Y]\not \subset U_A$ . Take a positive real number $\varepsilon>0$ such that $Y+\varepsilon I\in U$ . Then trivially we have $[X, Y+\varepsilon I]\not \subset U_A$ . By Proposition 5.4, it suffices to show: if $X\in U_A$ , $X>0$ and $[0, X]\not \subset U_A$ , then $\Phi _A(X)\ngeq 0$ . Suppose $X\in U_A$ satisfies $X>0$ and $[0, X]\not \subset U_A$ . By Proposition 5.7, the condition $[0, X]\not \subset U_A$ yields $X^{1/2}AX^{1/2}\ngeq -I$ . We obtain $X^{-1}+A \ngeq 0$ , which implies $\Phi _A(X)=(X^{-1}+A)^{-1}\ngeq 0$ .▪

For an operator $A\in {S}(H)$ , let $s(A)$ denote the support projection of A, namely, $s(A) = \chi _{(-\infty , \infty )\setminus \{0\}}(A)$ . We also use the notation $A_+ := A\chi _{(0, \infty )}(A)$ and $A_- := -A\chi _{(-\infty , 0)}(A)$ , which are positive and negative parts of A, respectively.

The rest of this section aims to prove the following.

Theorem 5.9 Let $A\in {S}(H)$ . Then the following two conditions are equivalent:

  1. 1. At least one of the operators $A_+$ and $A_-$ is compact.

  2. 2. The map $\Phi _A$ is an order isomorphism from ${{U}}_A$ onto ${{U}}_{-A}$ .

We first consider the case either $A_+$ or $A_-$ has finite rank.

Lemma 5.10 Let $m\in \{0, 1, \ldots \}\cup \{\infty \}$ satisfy $m\leq \dim H$ . Let ${V}$ denote the collection of all invertible $A\in {S}(H)$ with $\mathrm {rank\,} A_+=m$ .

  1. 1. The set ${V}$ is open and closed in the collection of all invertible operators in ${S}(H)$ .

  2. 2. Assume $m<\infty $ . Let $A_0, A_1\in {V}$ satisfy $A_0\leq A_1$ . If $A\in [A_0, A_1]$ , then $A\in V$ .

Proof (1) It suffices to prove the openness of V for each m. Let $A\in V$ for a fixed m. Since the collection of all invertible operators is open, we may take a positive real number $\varepsilon $ such that any element in $[A-\varepsilon I, A+\varepsilon I]$ is invertible. Clearly, we have $A-\varepsilon I, A+\varepsilon I\in V$ . Let $B\in [A-\varepsilon I, A+\varepsilon I]$ . Since $A-\varepsilon I\le B$ , the min-max theorem implies that $m=\mathrm {rank\,} (A-\varepsilon I)_+\leq \mathrm {rank\,} B_+$ . Since $B\le A+\varepsilon I$ , we also have $\mathrm {rank\,} B_+ \leq \mathrm {rank\,} (A+\varepsilon I)_+ = m$ . Thus, we obtain $\mathrm {rank\,} B_+ = m$ .

(2) Let $A\in [A_0, A_1]$ . The min-max theorem implies $\mathrm {rank\,} A_+\geq \mathrm {rank\,} (A_0)_+=m$ . We may take a positive real number $\varepsilon>0$ such that $\mathrm {rank\,} (A_1+\varepsilon I)_+ = m$ . The min-max theorem implies $\mathrm {rank\,} (A+\varepsilon I)_+ \leq \mathrm {rank\,} (A_1+\varepsilon I)_+ = m$ . Since $m<\infty $ , we see $\mathrm {rank\,} A_+= m$ and A is invertible.▪

For a projection $P\in B(H)$ , let us use the symbol $P^{\perp }:= I-P$ .

Lemma 5.11 Let $A\in S(H)$ . If either $A_+$ or $A_-$ has finite rank, then $\Phi _A$ is an order isomorphism from ${U}_A$ onto ${U}_{-A}$ .

Proof Put $S:=s(A_+)-s(A_+)^{\perp }$ , which is a self-adjoint unitary. Let $X\in S(H)$ . We have

$$ \begin{align*}\sigma(XA)\setminus \{0\}= \sigma(X\lvert A\rvert^{1/2} S\lvert A\rvert^{1/2})\setminus \{0\} = \sigma(\lvert A\rvert^{1/2}X\lvert A\rvert^{1/2} S)\setminus \{0\}. \end{align*} $$

Hence, we have $X\in \hat {U}_A$ if and only if $\lvert A\rvert ^{1/2}X\lvert A\rvert ^{1/2} S+I$ is invertible, which is in turn equivalent to the condition $\lvert A\rvert ^{1/2}X\lvert A\rvert ^{1/2} + S$ is invertible.

Suppose that $A_+$ has rank $m<\infty $ . We prove that $\Phi _A$ is order preserving. The preceding paragraph shows that $\lvert A\rvert ^{1/2}X\lvert A\rvert ^{1/2} + S$ is invertible for any $X\in {U}_A$ . Moreover, since $0\in U_A$ is connected, Lemma 5.10 implies that the positive part $\left (\lvert A\rvert ^{1/2}X\lvert A\rvert ^{1/2} + S\right )_+$ has rank m for any $X\in {U}_A$ . Suppose that $X, Y\in {U}_A$ satisfy $X\leq Y$ . Let $Z\in [X, Y]$ . Then we have the order relation

$$ \begin{align*}\lvert A\rvert^{1/2}X\lvert A\rvert^{1/2} + S\leq \lvert A\rvert^{1/2}Z\lvert A\rvert^{1/2} + S\leq \lvert A\rvert^{1/2}Y\lvert A\rvert^{1/2} + S. \end{align*} $$

By Lemma 5.10, $\lvert A\rvert ^{1/2}Z\lvert A\rvert ^{1/2} + S$ is invertible. Hence, $ZA+I$ is invertible for any $Z\in [X, Y]$ . It follows that $[X, Y]\subset {U}_A$ , and by Proposition 5.8, $\Phi _A(X)\leq \Phi _A(Y)$ holds.

The case that $A_-$ has finite rank can be considered in a similar way. The same argument shows that $\Phi _{A}^{-1} = \Phi _{-A}$ is also order preserving.▪

Proof of Theorem 5.9

$(1)\Rightarrow (2)$ Suppose that $A_+$ is compact. We show that $\Phi _A$ is order preserving. By Lemma 5.3 and Propositions 5.4 and 5.8, all we need to do is to prove that if $X \in U_A$ and $X \geq 0$ , then $[0,X] \in U_A$ .

By $X \in U_A$ , there exists a path $\tau : [0,1] \to U_A$ such that $\tau (0) = 0$ and $\tau (1) = X$ . Since $A_+$ is compact, we can find a sequence $(A_n) \subset S(H)$ such that $\lim A_n = A$ and $(A_n)_+$ is of finite rank for every positive integer n. For every $t \in [0,1]$ , the operator $\tau (t) A + I$ is invertible. It follows that there exists $\delta _t> 0$ such that if

$$ \begin{align*}s \in (t-\delta_t , t + \delta_t) \cap [0,1] \ \ \ \mathrm{and} \ \ \ B \in S(H) \ \ \ \mathrm{and} \ \ \ \| B - A\| <\delta_t, \end{align*} $$

then $\tau (s) B +I$ is invertible. Using the compactness, we see that there exists $\delta> 0$ such that $\tau (s) B + I$ is invertible for every $s \in [0,1]$ and every $B \in S(H)$ with $\| B - A \| < \delta $ . Thus, after removing finitely many elements of the sequence, we may assume that $\tau (s) A_n +I$ is invertible for every $s \in [0,1]$ and every positive integer n. It follows that $X \in U_{A_n}$ . By Lemma 5.11 and Proposition 5.8, we conclude that $[0,X] \subset U_{A_n}$ . By Proposition 5.7, we have $X^{1/2} A_n X^{1/2} \ge -I$ for each n. Taking the limit $n \to \infty $ , we obtain $X^{1/2} A X^{1/2} \ge -I$ . By Proposition 5.7 again, we have $[0,X] \subset U_A$ , as desired.

The case that $s(A_-)$ is compact can be considered in a similar way, or we may use the equation $\Phi _{-A}(X) = (-XA+I)^{-1}X = -\Phi _A(-X)$ for $X\in U_{-A}$ as well. The same argument shows that $\Phi _{A}^{-1} = \Phi _{-A}$ is also order preserving.

$(2)\Rightarrow (1)$ Suppose that both $A_+$ and $A_-$ are noncompact. Then we may take a positive real number $\varepsilon>0$ such that both $\chi _{[\varepsilon , \infty )}(A)$ and $\chi _{(-\infty , -\varepsilon ]}(A)$ have infinite rank. We can find a projection $P\in S(H)$ with $\chi _{[\varepsilon , \infty )}(A)\leq P\leq \chi _{(-\infty , -\varepsilon ]\cup [\varepsilon , \infty )}(A)$ such that P and $\chi _{[\varepsilon , \infty )}(A)$ are unitarily equivalent in $K:=\chi _{(-\infty , -\varepsilon ]\cup [\varepsilon , \infty )}(A)H$ , $P\neq \chi _{[\varepsilon , \infty )}(A)$ , and $PA=AP$ . Take a unitary $u=e^{iB}\in B(K)$ , $B\in S(K)$ , such that $u\chi _{[\varepsilon , \infty )}(A)u^* = P$ . Put $S:= \chi _{[\varepsilon , \infty )}(A)- \chi _{(-\infty , -\varepsilon ]}(A)$ , which can be considered a self-adjoint unitary in $B(K)$ . We define a path $\tau : [0, 1]\to S(K)$ by

$$ \begin{align*}\tau(t) = \lvert A\rvert^{-1/2}(e^{itB} Se^{-itB} -S) \lvert A\rvert^{-1/2} \end{align*} $$

(which is well defined since A restricted to K is invertible). We identify each element $X\in S(K)$ with $\chi _{(-\infty , -\varepsilon ]\cup [\varepsilon , \infty )}(A)X\chi _{(-\infty , -\varepsilon ]\cup [\varepsilon , \infty )}(A)\in S(H)$ . Then,

$$ \begin{align*}\lvert A \rvert^{1/2}\tau(t)\lvert A\rvert^{1/2} + (s(A_+)-s(A_+)^{\perp})= e^{itB} Se^{-itB} +(\chi_{(0, \varepsilon)}(A)- \chi_{(-\varepsilon, 0]}(A)) \end{align*} $$

is invertible in $B(H)$ for any $t\in [0, 1]$ . In particular, we have $\tau (1)\in U_A$ (see the first paragraph of the proof of Lemma 5.11). However, we have

$$\begin{align*}\tau(1) = \lvert A\rvert^{-1/2} 2(P-\chi_{[\varepsilon, \infty)}(A)) \lvert A\rvert^{-1/2} = 2\lvert A\rvert^{-1}(P-\chi_{[\varepsilon, \infty)}(A))\geq 0 \end{align*}$$

and

$$\begin{align*}\begin{aligned} \Phi_A(\tau(1)) &= \Phi_A(2\lvert A\rvert^{-1}(P-\chi_{[\varepsilon, \infty)}(A)))\\ &= 2\lvert A\rvert^{-1}(P-\chi_{[\varepsilon, \infty)}(A))\cdot (A\cdot 2\lvert A\rvert^{-1}(P-\chi_{[\varepsilon, \infty)}(A))+I)^{-1}\\ &= -2\lvert A\rvert^{-1}(P-\chi_{[\varepsilon, \infty)}(A))\ngeq 0=\Phi_A(0).\\[-17pt] \end{aligned} \end{align*}$$

6 Finite-dimensional case

When dealing with the finite-dimensional case, we will always identify operators with matrices. We denote by $E_n$ the effect algebra on the n-dimensional Hilbert space, $E_n = [0,I]$ , that is, $E_n$ is the set of all $n \times n$ hermitian matrices whose all eigenvalues belong to the unit interval $[0,1]$ . As already indicated in Section 1, we will begin with an automatic continuity result for order embeddings of matrix domains. First, we need some technical lemmas.

Lemma 6.1 Let $A,B \in S_n$ be two different matrices with $A \le B$ . Denote $r = \mathrm {rank} (B-A)$ . Then there exists a continuous order isomorphism from $E_r$ onto $[A,B]$ .

Actually, we will prove more. We will find an order isomorphism that is not just continuous, but a restriction of an affine map.

Proof After applying a translation $X \mapsto X-A$ , we may assume with no loss of generality that $A=0$ and $B \in S_n$ satisfies $B \ge 0$ and $\mathrm {rank }\, B =r$ . Furthermore, there is no loss of generality in assuming that the matrix B is diagonal with the first r diagonal entries positive and all others equal to zero. Applying a congruence transformation $X \mapsto TXT^{\ast }$ , where T is a suitable diagonal invertible element in $M_n$ , we can finally assume that B is the diagonal projection with the first r diagonal entries equal to one and all others equal to zero. It is now clear that $[A,B]$ is the set of all $n \times n$ matrices whose upper left $r \times r$ corner is an element of $E_r$ and all entries outside the upper left $r \times r$ corner are zero.

Lemma 6.2 Let $m,n$ be positive integers, and let $\phi : E_n \to S_m$ be an order embedding. Then the set of all points $c \in (0,1)$ for which $\phi $ is not continuous at $cI$ is at most countable.

Proof Consider the order embedding $f : [0,1] \to \mathbb {R}$ defined by $f(t) := \mathrm {tr}\, (\phi (tI))$ . Here, $\mathrm {tr}\, (\cdot )$ stands for the trace function. We know that the set N of all points $c \in (0,1)$ at which f is not continuous is at most countable. Let $c \in (0,1) \setminus N$ and $\varepsilon>0$ . Then we can find $\delta $ , $0 < \delta < \min \{ c, 1-c \}$ , such that for every real $t \in [ c- \delta , c + \delta ]$ we have $| f(c) - f(t) | \le \varepsilon $ . In particular, $| \mathrm {tr}\, (\phi (cI) - \phi ((c \pm \delta ) I)) | \le \varepsilon $ . Since $\phi ((c - \delta )I) \le \phi (cI)$ and $\phi ((c + \delta )I) \ge \phi (cI)$ , we conclude that $\phi (cI) - \varepsilon I \le \phi ((c-\delta )I) \le \phi ((c+\delta )I) \le \phi (cI) + \varepsilon I$ (note that we are using the same symbol I to denote the $n \times n$ identity matrix and the $m \times m$ identity matrix). This further implies that for every $X \in [ (c-\delta )I , ( c+ \delta )I ]$ we have $\phi (cI) - \varepsilon I \le \phi (X) \le \phi (cI) + \varepsilon I$ , and thus $\phi $ is continuous at $cI$ .▪

Lemma 6.3 Let $m,n$ be positive integers, and assume that there exists an order embedding $\phi : E_n \to S_m$ . Then $n \le m$ .

Proof By induction on n. The case $n=1$ is trivial. Assume that the statement holds for $n= k-1$ ( $ \ge 1$ ). We prove the statement for $n=k$ . By Lemma 6.2, we can find a real number c, $0 < c < 1$ , such that $\phi $ is continuous at $cI$ . We take any projection $P\in E_n$ of rank $k-1$ . Observe that the rank of $(P+cP^{\perp }) - cI$ is $k-1$ . By Lemma 6.1 and the induction hypothesis, the rank of $\phi (P + cP^{\perp }) - \phi (cI)$ is no smaller than $k-1$ .

We claim that $(\phi (P + cP^{\perp }) - \phi (cI)) + (\phi (cP + dP^{\perp }) - \phi (cI))$ has rank $\ge k$ for every d, $c < d \le 1$ . If this does not hold, then there exists some $d> c$ such that the range of $\phi (cP + dP^{\perp }) - \phi (cI)$ is contained in the range of $\phi (P + cP^{\perp }) - \phi (cI)$ . Since $\phi $ is continuous at $cI$ , there exists $d'$ with $c < d' < d$ such that $\phi (cP + d' P^{\perp }) - \phi (cI) \le \phi (P + cP^{\perp }) - \phi (cI)$ , and therefore $\phi (cP + d' P^{\perp }) \le \phi (P + cP^{\perp })$ . Since $\phi $ is an order embedding, we necessarily have $cP + d' P^{\perp } \le P + cP^{\perp }$ , a contradiction. Thus, we have shown that $m \ge k$ .▪

Corollary 6.4 Let n be a positive integer, and let $A,B \in S_n$ be hermitian matrices with $A < B$ . Assume that $\phi : [A,B] \to S_n$ is an order embedding. Then $\phi (A) < \phi (B)$ .

Proof By Lemma 6.1, the interval $[A,B]$ is order isomorphic to $E_n$ , whereas the interval $[\phi (A), \phi (B)]$ is order isomorphic to $E_m$ , where m is the rank of $\phi (B) - \phi (A)$ . Since $\phi $ maps $[A,B]$ into $[\phi (A), \phi (B)]$ , Lemma 6.3 yields that $m=n$ .▪

The following result can be found in [Reference Šemrl11].

Theorem 6.5 [Reference Šemrl11, Theorem 2.4]

Let $n \ge 2$ . For every pair $A,B \in (0,I) \subset E_n$ , there exists an order automorphism $\phi : E_n \to E_n$ such that $\phi (A) = B$ .

By Theorem 3.3, every order automorphism of $E_n$ is continuous. Using Lemma 6.1 and the remark that follows that lemma, we can easily deduce the next statement.

Corollary 6.6 Let $n \ge 2$ and $A,B,C,D,E,F \in S_n$ with $A< B < C$ and $D < E < F$ . Then there exists a continuous order isomorphism $\phi : [A,C] \to [D,F]$ such that $\phi (B) = E$ .

Let $A\in S_n$ , and assume that $A \ge 0$ . Clearly, $A_0$ , the restriction of A to the range of A, is an invertible operator on the range of A. We denote by $A^{\dagger }$ the Moore–Penrose inverse of A, that is, the restriction of $A^{\dagger }$ to the null space of A is the zero operator, wheras the restriction of $A^{\dagger }$ to the range of A is the inverse of $A_0$ .

Lemma 6.7 Let $A,R \in S_n$ satisfy $A \ge 0$ , $R\ge 0$ , and $\mathrm {rank}\, R = 1$ . Then $R \le A$ if and only if the range of R is contained in the range of A and $\mathrm {tr}\, (A^{\dagger } R) \le 1$ .

Proof Assume first that $R \le A$ . Then the range of R is a subspace of the range of A, and we have

$$ \begin{align*}(A^{\dagger})^{1/2} R (A^{\dagger})^{1/2} \le (A^{\dagger})^{1/2} A (A^{\dagger})^{1/2} = P, \end{align*} $$

where P denotes the projection onto the range of A. After replacing $A, A^{\dagger } , R,P$ with their restrictions to the range of A, we can rewrite the above inequality as $A^{-1/2} R A^{-1/2} \le I$ , and since $A^{-1/2} R A^{-1/2}$ is a positive rank-one operator, this is equivalent to $\mathrm {tr}\, (A^{-1} R ) = \mathrm { tr}\, (A^{-1/2} R A^{-1/2} ) \le 1$ .

The proof of the other direction is now easy and is left to the reader.▪

By $P_{n}^k \subset E_n$ , we denote the set of all $n \times n$ projections of rank k and by ${\cal S} \subset \mathbb {R}^3$ the euclidean sphere with center $0$ and radius $1/2$ . It is well known that $P_{2}^1$ is affine isometrically isomorphic to ${\cal S}$ . An isomorphism (known as Bloch’s representation) is given by ${\cal S} \ni (x,y,z) \mapsto \left [ \begin {matrix} x + 1/2 & y + iz \cr y - iz & -x + 1/2 \cr \end {matrix} \right ]$ . In addition to the usual euclidean distance, we also consider the geodesic distance $d_g$ on ${\cal S}$ defined for $x,y \in {\cal S}$ as the unique real number satisfying $0 \le d_g (x,y) \le \pi /2$ and $| x-y | = \sin d_g (x,y)$ . Here, $| \cdot |$ denotes the euclidean norm.

Lemma 6.8 Let $P,Q \in P_{2}^1$ be orthogonal and $0 \le c < d \le 1$ real numbers. Then a projection $E \in P_{2}^1$ satisfies $dE \le P + cQ$ if and only if $\| P - E \| \le \sqrt { (c-cd) / (d - cd) }$ . In particular, we have $(1/2) E \le P + cQ$ if and only if $\| P - E \| \le \sqrt { c / (1 - c) }$ .

Proof The statement is trivial when $c=0$ or $d=1$ . Thus, we assume that $0< c < d <1$ . Taking an appropriate orthonormal basis of $\mathbb {C}^2$ , we may assume $P= \begin {bmatrix}1 & 0 \\ 0 & 0 \end {bmatrix}$ , $Q= \begin {bmatrix}0 & 0 \\ 0 & 1 \end {bmatrix}$ , and $E= \begin {bmatrix}s^2 & s\sqrt {1-s^2} \\ s\sqrt {1-s^2} & 1-s^2 \end {bmatrix}$ for some real number $0\leq s\leq 1$ . Note that $P-E$ is a trace zero $2 \times 2$ hermitian matrix and therefore $\| P-E\| = \sqrt { - \det (P-E)} = \sqrt { 1 - s^2}$ , and

$$ \begin{align*}(P+cQ)^{-1} = \begin{bmatrix}1 & 0 \\ 0 & c^{-1} \end{bmatrix}. \end{align*} $$

The proof can be completed by a straightforward application of Lemma 6.7.▪

Lemma 6.9 Let $\psi : {\cal S} \to {\cal S}$ be a homeomorphism. Suppose that for every $x \in {\cal S}$ there exists an increasing bijection $g_x : [0,1] \to [0, 1]$ such that $| \psi (y) - \psi (x) | = g_x (| y-x |)$ for every $y\in {\cal S}$ . Then $\psi $ is a surjective isometry on ${\cal S}$ with respect to the euclidean distance.

Proof It is easy to see that $\psi $ preserves antipodes. Let $x\in {\cal S}$ and $0<c<1$ . Then $C_{x, c}:=\{y\in {\cal S}\, : \, \lvert y-x\rvert = c\}$ is mapped onto $C_{\psi (x), g_x(c)}=\{y\in {\cal S}\, : \, \lvert y-\psi (x)\rvert = g_x (c)\}$ . (These collections are circles in ${\cal S}$ .) Therefore, for any circle C in ${\cal S}$ , the image $\psi (C)$ is a circle in ${\cal S}$ .

Let $x_1, x_2$ be distinct elements in ${\cal S}$ . Suppose that $x_1$ and $x_2$ are not antipodal in ${\cal S}$ . Take the great circle $C_0$ in ${\cal S}$ that contains the two points $x_1, x_2$ . Then the image $\psi (C_0)$ is a circle in ${\cal S}$ . Let $x\in C_0\setminus \{x_1, x_2, -x_1, -x_2\}$ . An elementary calculation shows that we can take $c_1, c_2\in (0, 1)$ such that $C_{x_1, c_1}\cap C_{x_2, c_2} = \{x\}$ . It follows that $C_{\psi (x_1), g_{x_1}(c_1)}\cap C_{\psi (x_2), g_{x_2}(c_2)} = \{\psi (x)\}$ . This equation implies that $\psi (x)$ lies in the great circle that contains the two points $\psi (x_1), \psi (x_2)$ . Hence, the image $\psi (C_0)$ is the great circle that contains the two points $\psi (x_1), \psi (x_2)$ .

We consider the geodesic distance $d_g$ for a while. We already know that $\psi $ preserves the geodesic distance $\pi /2$ . That is, we have $d_g(\psi (x_1), \psi (x_2))= \pi /2$ if $d_g(x_1, x_2)= \pi /2$ . Suppose that the geodesic distance d with $0<d\leq \pi /2$ is preserved by $\psi $ . We prove that the geodesic distance $d/2$ is also preserved by $\psi $ . Let $x_1, x_2\in {\cal S}$ satisfy $d_g(x_1, x_2)=d/2$ . Take the great circle $C_0$ in ${\cal S}$ that contains the two points $x_1, x_2$ . Take the unique point $x_0\in C_0\setminus \{x_2\}$ such that $d_g(x_1, x_0)=d/2$ . Then we have $d_g(x_0, x_2) = d$ , and hence $d_g(\psi (x_0), \psi (x_2))=d$ . It follows that

$$\begin{align*}\{\psi(x_0), \psi(x_2)\} \subset \psi(C_{x_1, \sin(d/2)}\cap C_0) = \psi(C_{x_1, \sin(d/2)})\cap\psi(C_0). \end{align*}$$

Note that $\psi (C_{x_1, \sin (d/2)})$ is a circle with center $\psi (x_1)\in \psi (C_0)$ . Note also that $\psi $ restricted to $C_0$ is a homeomorphism onto $\psi (C_0)$ and preserves antipodes. Hence, we obtain $d_g(\psi (x_1), \psi (x_2))= d/2$ .

We next prove the following in a similar way: if $\psi $ preserves the geodesic distances $d_1, d_2>0$ with $d_1+d_2<\pi /2$ , then $\psi $ also preserves the geodesic distance $d_1+d_2$ . Let $x_1, x_2\in {\cal S}$ satisfy $d_g(x_1, x_2)=d_1+d_2$ . Take the great circle $C_0$ in ${\cal S}$ that contains the two points $x_1, x_2$ . Take the unique point $x_0\in C_0$ such that $d_g(x_1, x_0)=d_1$ and $d_g(x_0, x_2)=d_2$ . Then we have $d_g(\psi (x_1), \psi (x_0))=d_1$ and $d_g(\psi (x_0), \psi (x_2))=d_2$ . Since $\psi $ restricted to $C_0$ is a homeomorphism onto $\psi (C_0)$ and preserves antipodes, we obtain $d_g(\psi (x_1), \psi (x_2)) = d_1+d_2$ .

It follows that $\psi $ preserves the geodesic distance $k\pi /2^l$ whenever $k, l$ are positive integers with $k/2^l\leq 1/2$ . Since $\psi $ is a homeomorphism, we see that $\psi $ is an isometry with respect to the geodesic distance, thus also an isometry with respect to the euclidean distance in $\mathbb {R}^3$ .▪

The next result is the crucial step in proving the automatic continuity for order embeddings of matrix domains. From now to the end of this section, we will always assume that $n \ge 2$ .

Theorem 6.10 Let $\phi : E_n \to S_n$ be an order embedding that is continuous at $0$ and I. Then $\phi $ is an order isomorphism of $E_n$ onto $[ \phi (0), \phi (I) ]$ .

It is easy to see that the assumption of continuity at the endpoints of the matrix interval is indispensable. For one can take the map $\phi : E_n \to S_n$ defined by $\phi (X) = X$ whenever $X \not =I$ and $\phi (I) = 2I$ and easily verify that it is an order embedding. Nevertheless, we will also give the general form of order embeddings of $E_n$ without assuming continuity in Theorem 7.4.

Proof By Lemma 6.2, there exists a real number $0<t<1$ such that $\phi $ is continuous at $tI$ . By Corollary 6.4, we have $\phi (0)<\phi (tI)<\phi (I)$ . By Corollary 6.6, there exist continuous order isomorphisms $\psi _1: E_n\to E_n$ and $\psi _2: [\phi (0), \phi (I)]\to E_n$ such that $\psi _1(I/2) = tI$ and $\psi _2(\phi (tI)) = I/2$ . Considering $\psi _2\circ \phi \circ \psi _1: E_n\to E_n$ instead of $\phi $ , we may assume that $\phi $ is an order embedding from $E_n$ into itself, and also fixes the three points $0, I/2, I$ , and is continuous at these points.

We next prove that $\phi $ maps every projection of rank m to a projection of rank m, $0\leq m\leq n$ . By Corollary 6.4, we know that $\phi ((0, I))\subset (0, I)$ . If P is a rank-one projection, then $P\nleq X$ holds for any $X\in (0, I)$ . By the assumption that $\phi $ is continuous at I, there exists a sequence $(X_k)_{k\ge 1}$ in $\phi ((0, I))\,\, (\subset (0, I))$ such that $X_k\to I$ . It follows that $\phi (P)\nleq X_k$ for any $k\ge 1$ , and hence $\phi (P)$ has $1$ as its eigenvalue. Since the subset $[P, I]$ , which is order isomorphic to $E_{n-1}$ , is mapped into $[\phi (P), \phi (I)] = [\phi (P), I]$ , by Lemmas 6.1 and 6.3, the multiplicity of $1$ as an eigenvalue of $\phi (P)$ is one. In other words, $[\phi (P), I]$ is order isomorphic to $E_{n-1}$ . Consider the restriction $\phi |_{[P, I]}: [P, I] \to [\phi (P), I]$ . Then the same discussion shows the following: for any rank-one projection Q with $PQ=0$ , $\phi (P+Q)$ has $1$ as an eigenvalue with multiplicity $2$ . Iterate the same, then we have: for any $0\leq m\leq n$ and any rank-m projection P, $\phi (P)$ has $1$ as an eigenvalue with multiplicity m. Let $0\leq m\leq n$ . Using the continuity of $\phi $ at $0$ , a similar argument ensures that if P is a projection with rank m, then $\phi (P)$ has $0$ as an eigenvalue with multiplicity $n-m$ . It follows that if P is a projection with rank m, then so is $\phi (P)$ . By the assumption that $\phi $ fixes $I/2$ and is continuous at $I/2$ , we also see that for any projection P, there exists a projection Q such that $\mathrm {rank\,} P= \mathrm {rank\,} Q$ and $\phi (P/2)=Q/2$ . Since $\phi $ is an order embedding, we obtain $\phi (P/2)=\phi (P)/2$ .

Let us show that the restriction $\phi |_{P_{n}^1}$ is an isometry with respect to the metric induced by the operator norm. For any subspace $V\subset \mathbb {C}^n$ , we denote by $P^1(V) \subset P_{n}^1$ the subset of all rank-one projections whose ranges are contained in V. It suffices to show that $\phi |_{P^1(V)}$ is an isometry for any two-dimensional subspace $V\subset \mathbb {C}^n$ . Let $P\in P^1(V)$ . Take the unique projection $Q\in P^1(V)$ such that $PQ=0$ . By the preceding paragraph, $\phi (P+Q)$ is a projection of rank two. Denote by W the range of $\phi (P+Q)$ , and take the unique projection $Q'\in P^1(W)$ such that $\phi (P)Q'=0$ . For a real number $0\leq c\leq 1$ , we have $P\leq P+cQ\leq P+Q$ , and therefore $\phi (P) \leq \phi (P+cQ)\leq \phi (P)+ Q'$ . Thus, there exists a monotone increasing function $f_P: [0, 1]\to [0, 1]$ such that $\phi (P+cQ) = \phi (P) + f_P(c) Q'$ . We prove that $f_P(c)\to 0$ as $c\to 0$ . By the continuity of $\phi $ at $0$ , we know that $\phi (2c(P+Q))\to 0$ as $c\to 0$ . However, by $P+cQ\ngeq 2c(P+Q)$ , $c>0$ , we obtain $\phi (P)+ f_P(c) Q'=\phi (P+cQ)\ngeq \phi (2c(P+Q))$ . Hence, we conclude that $f_P(c)\to 0$ as $c\to 0$ .

Since $\phi (E/2)= \phi (E)/2$ for any $E\in P^1(V)$ , Lemma 6.8 with $d=1/2$ assures the continuity of $\phi |_{P^1(V)}$ at P. Hence, $\phi |_{P^1(V)}$ is an injective continuous map from $P^1(V)$ into $P^1(W)$ . Since both $P^1(V)$ and $P^1(W)$ can be identified with the two-dimensional compact connected manifold ${\cal S}$ without boundary, by the invariance of domain theorem, we actually have $\phi (P^1(V)) = P^1(W)$ . Fix $P\in P^1(V)$ , Q as above again. It follows that for any $0< c< 1/2$ , $\phi $ maps the collection $\{E\in P^1(V)\, : \, E/2 \leq P+dQ \,\,\text { for any }\,\, d>c,\,\, E/2 \nleq P+dQ\,\, \text { for any }\,\,d<c\}$ into the collection $\{E\in P^1(W)\, : \, E/2\leq \phi (P) + f_P(d)Q'\,\, \text { for any }\,\,d>c,\,\, E/2\nleq \phi (P) + f_P(d)Q' \,\,\text { for any }\,\,d<c\}$ . By Lemma 6.8, the former collection is equal to $\{E\in P^1(V)\, : \, \lVert P-E\rVert = \sqrt {c/(1-c)}\}$ and hence homeomorphic to the circle. The latter collection is

$$ \begin{align*}\{E\in P^1(W) : \lVert P-E\rVert \in [\lim_{d\uparrow c} \sqrt{f_P(d)/(1-f_P(d))}, \lim_{d\downarrow c} \sqrt{f_P(d)/(1-f_P(d))}]\}. \end{align*} $$

Since $\phi $ restricts to a homeomorphism from $P^1(V)$ onto $P^1(W)$ , we see that $f_P$ is a continuous monotone increasing bijection on $[0, 1/2]$ . Hence, we may apply Lemma 6.9 for

$$ \begin{align*}\psi=\phi|_{P^1(V)}: P^1(V)\to P^1(W), \end{align*} $$

and

$$ \begin{align*}g_P(\sqrt{c/(1-c)})=\sqrt{f_P(c)/(1-f_P(c))}, \ \ \ 0\leq c\leq 1/2, \end{align*} $$

to obtain that $\phi |_{P^1(V)}$ is an isometry.

Since $P_{n}^1$ is a compact connected manifold without boundary, we see that $\phi $ restricts to a surjective isometry on $P_{n}^1$ by the invariance of domain theorem. Applying Wigner’s unitary-antiunitary theorem, we see that there exists a unitary or antiunitary $u: \mathbb {C}^n \to \mathbb {C}^n$ such that $\phi (P) = uPu^*$ , $P\in P_{n}^1$ . We will prove that $\phi (A) = uAu^*$ for any $A\in E_n$ . It suffices to show that the map $\phi _0: E_n\to E_n$ given by $\phi _0(A) := u^*\phi (A) u$ is the identity map on $E_n$ . It is easy to see that $\phi _0$ fixes every (not necessarily rank-one) projection.

Take any two-dimensional subspace $V\subset \mathbb {C}^n$ and mutually orthogonal projections $P, Q\in P^1(V)$ . Fix a real number $0\leq c<1/2$ . By Lemma 6.8 with $d=1/2$ , for $E\in P^1(V)$ , the condition $\lVert P-E\rVert \leq \sqrt {c/(1-c)}$ is equivalent to $E/2\leq P+cQ$ , which is in turn equivalent to $\phi _0(E/2)\leq \phi _0(P+cQ)$ . We know that $\phi _0(E/2)=E/2$ . Moreover, since $P=\phi _0(P)\leq \phi _0(P+cQ)\leq \phi _0(P+Q)=P+Q$ , there exists a real number $c'\in [0, 1]$ such that $\phi _0(P+cQ)= P+c'Q$ . Hence, by Lemma 6.8 again, the condition $\phi _0(E/2)\leq \phi _0(P+cQ)$ is equivalent to $\lVert P-E\rVert \leq \sqrt {c'/(1-c')}$ . Therefore, for $E\in P^1(V)$ , two conditions $\lVert P-E\rVert \leq \sqrt {c/(1-c)}$ and $\lVert P-E\rVert \leq \sqrt {c'/(1-c')}$ are equivalent. We obtain $c=c'$ , that is, $\phi _0(P+cQ)=P+cQ$ for any $0\leq c<1/2$ .

We fix a two-dimensional subspace $V\subset \mathbb {C}^n$ again, but fix $E\in P^1(V)$ instead of P. Let $0<d< 1$ be a real number. By Lemma 6.8 with $c=d/2$ , for $P\in P^1(V)$ , the condition $\lVert P-E\rVert \leq \sqrt {(1-d)/(2-d)}$ is equivalent to $dE\leq P+dQ/2$ , where Q is the unique projection in $P^1(V)$ with $PQ=0$ . Then this condition is in turn equivalent to $\phi _0(dE)\leq \phi _0(P+dQ/2)$ . The preceding paragraph implies $\phi _0(P+dQ/2)=P+dQ/2$ . Since $0 =\phi _0(0)\leq \phi _0(dE)\leq \phi _0(E)=E$ , there exists $d'\in (0, 1)$ such that $\phi _0(dE)=d'E$ . Hence, by Lemma 6.8 again, the condition $\phi _0(dE)\leq \phi _0(P+dQ/2)$ is equivalent to $\lVert P-E\rVert \leq \sqrt {d(1-d')/(d' (2-d))}$ . It follows that $(1-d)/(2-d) = d(1-d')/(d' (2-d))$ , and consequently, $d=d'$ .

We have shown that $\phi _0(dE)=dE$ for any $E\in P_{n}^1$ and $d\in [0, 1]$ . Let $A\in E_n$ . Lemma 6.7 implies that the ranges of A and $\phi _0 (A)$ coincide and that $\mathrm {tr}\, (A^{\dagger } P) = \mathrm {tr}\, (\phi _0 (A)^{\dagger } P)$ for every $P \in P_{n}^1$ whose range is contained in the range of A. It follows that $A^{\dagger } = \phi _0 (A)^{\dagger }$ , and therefore $A = \phi _0 (A)$ .▪

Theorem 6.11 Let $U \subset S_n$ be a matrix domain, and let $\phi : U \to S_n$ be an order embedding. Then $\phi (U) \subset S_n$ is open, and $\phi : U \to \phi (U)$ is a homeomorphism.

Proof By the invariance of domain theorem, it suffices to show continuity. Let $A\in U$ . Lemma 6.2 implies that we can take real numbers $c_0, c_1>0$ such that $[A-c_0 I, A+c_1 I]\subset U$ and $\phi $ is continuous at the two points $A-c_0 I, A+c_1 I$ . By Corollary 6.4, $\phi (A-c_0 I) < \phi (A+c_1 I)$ . Using the preceding theorem, we see that $\phi $ restricts to an order isomorphism from $[A-c_0 I, A+c_1 I]$ onto $[\phi (A-c_0 I), \phi (A+c_1 I)]$ . We know that every order isomorphism between two operator intervals is continuous, and hence $\phi $ is continuous at A.▪

Theorem 1.2 is an easy consequence of Theorem 6.11 and results in the preceding sections. Indeed, assume first that a map $\phi : U \to S_n$ has a continuous extension to $U \cup \Pi _n$ that maps $\Pi _n$ biholomorphically onto itself. Then, by Theorem 1.1, $\phi : U \to S_n$ is a local order isomorphism. It follows from Proposition 5.1 and Lemma 5.11 that the maximal extension of $\phi $ is an order isomorphism which trivially yields that $\phi $ is an order embedding. The other direction is even easier. If $\phi $ is an order embedding, then by the previous theorem $\phi : U \to \phi (U)$ is an order isomorphism between two matrix domains. In particular, it is a local order isomorphism, and the desired conclusion follows again from Theorem 1.1.

It is now clear that if we want to have a full understanding of order embeddings of matrix domains, we only need to understand the structure of maximal order isomorphisms of matrix domains. On the one hand, one can say that this has been already achieved in the previous sections, but on the other hand, one would like to have concrete matrix formulae for such maps. In order to obtain such formulae, we need some more notation. If $0 \le p \le n$ , then the symbol $S_n(p)$ will stand for the set of all invertible $n \times n$ hermitian matrices with exactly p positive eigenvalues and $n-p$ negative eigenvalues. Here, each eigenvalue is counted with its multiplicity. Let $m,p$ be nonnegative integers with $p \le m \le n$ . We write each matrix $X \in S_n$ as a block matrix

$$ \begin{align*}X = \left[ \begin{matrix} X_{11} & X_{12} \cr X_{12}^{\ast} & X_{22} \cr \end{matrix} \right] , \end{align*} $$

where $X_{11} \in S_m$ . Put

$$ \begin{align*}U(m,p) = \{ X \in S_n \, : \, X_{11} \in S_m (p) \}. \end{align*} $$

Clearly, $U(m, p)$ is a matrix domain in $S_n$ . Define a map $\phi _{m,p} : U(m,p) \to U(m, m-p)$ by

$$ \begin{align*}\phi_{m,p} (X) = \left[ \begin{matrix} -X_{11}^{-1} & iX_{11}^{-1} X_{12} \cr -iX_{12}^{\ast} X_{11}^{-1} & X_{22} - X_{12}^{\ast} X_{11}^{-1}X_ {12}\cr \end{matrix} \right] , \ \ \ X = \left[ \begin{matrix} X_{11} & X_{12} \cr X_{12}^{\ast} & X_{22} \cr \end{matrix} \right] \in U(m,p). \end{align*} $$

We need to explain that, in the extreme case when $m=p=0$ , we have $X = X_{22}$ , and in this case, $\phi _{0,0}$ is the identity map defined on the whole $S_n$ . In the other extreme case when $m=n$ , the map $\phi _{n,p}$ is $X \mapsto - X^{-1}$ , mapping $S_n (p)$ onto $S_n (n-p)$ .

A straightforward calculation shows that for any $X = \left [ \begin {matrix} X_{11} & X_{12} \cr X_{12}^{\ast } & X_{22} \cr \end {matrix} \right ] \in U(m,p)$ , we have

(3) $$ \begin{align} -\left[ \begin{matrix} X_{11} & X_{12} & 0 \cr X_{12}^{\ast} & X_{22} & iI \cr 0 & -iI & 0 \cr \end{matrix} \right]^{-1} = \left[ \begin{matrix} -X_{11}^{-1} & 0 & iX_{11}^{-1} X_{12} \cr 0 & 0 & -iI \cr -iX_{12}^{\ast} X_{11}^{-1} & iI & X_{22} - X_{12}^{\ast} X_{11}^{-1}X_ {12}\cr \end{matrix} \right] \end{align} $$

in $M_{2n-m}$ , where I stands for the $(n-m) \times (n-m)$ identity matrix. Obviously, $t \mapsto \left [ \begin {matrix} X_{11} & tX_{12} & 0 \cr tX_{12}^{\ast } & tX_{22} & iI \cr 0 & -iI & 0 \cr \end {matrix} \right ]$ , $t \in [0,1]$ , is a continuous path consisting of invertible hermitian matrices connecting $\left [ \begin {matrix} X_{11} & 0 & 0 \cr 0 & 0 & iI \cr 0 & -iI & 0 \cr \end {matrix} \right ]$ with $\left [ \begin {matrix} X_{11} & X_{12} & 0 \cr X_{12}^{\ast } & X_{22} & iI \cr 0 & -iI & 0 \cr \end {matrix} \right ]$ , and therefore $\left [ \begin {matrix} X_{11} & X_{12} & 0 \cr X_{12}^{\ast } & X_{22} & iI \cr 0 & -iI & 0 \cr \end {matrix} \right ]\in S_{2n-m}(n+p-m)$ .

Lemma 6.12 Let $0 \le p \le m \le n$ . The map $\phi _{m, p}$ is a maximal order isomorphism from $U(m, p)$ onto $U(m, m-p)$ .

Proof A direct calculation shows that $\phi _{m, p}$ is a bijection from $U(m, p)$ onto $U(m, m-p)$ , and the inverse map is $\phi _{m, m-p}$ . Since $S_{2n-m}(n+p-m)\subset S_{2n-m}$ is a matrix domain, Theorem 1.2 implies that the map $Y\mapsto -Y^{-1}$ is a maximal order isomorphism from $S_{2n-m}(n+p-m)$ onto $S_{2n-m}(n-p)$ . Hence, equation (3) shows that $\phi _{m, p}$ is an order preserving map. Similarly, $\phi _{m, m-p}$ also preserves order, so $\phi _{m, p}$ is an order isomorphism. The maximality of $\phi _{m, p}$ is clear.▪

Lemma 6.13 Let $0 \le p \le m \le n$ . Take the maximal integer k such that there exist $X\in U(m, p)$ , $Y\in S_n$ with $Y\ge 0$ , $\mathrm {rank\,} Y=k$ , and $X+cY\in U(m, p)$ for all real numbers $c\ge 0$ . Then $k=n+p-m$ . Similarly, take the maximal integer l such that there exist $X\in U(m, p)$ , $Y\in S_n$ with $Y\ge 0$ , $\mathrm {rank\,} Y=l$ , and $X-cY\in U(m, p)$ for all $c\ge 0$ . Then ${l=n-p}$ .

Proof We prove the first half. The second half can be proved in a similar manner. Fix $X = \left [ \begin {matrix} X_{11} & X_{12} \cr X_{12}^{\ast } & X_{22} \cr \end {matrix} \right ] \in U(m,p)$ . Putting $Y = \left [ \begin {matrix} (X_{11})_+ & 0 \cr 0 & I \cr \end {matrix} \right ] \in S_n$ , we obtain $k\ge n+p-m$ . Let $Y = \left [ \begin {matrix} Y_{11} & Y_{12} \cr Y_{12}^{\ast } & Y_{22} \cr \end {matrix} \right ] \in S_n$ , where we use the same block decomposition as X, satisfy $Y\ge 0$ and $\mathrm {rank\,} Y\ge n+p-m+1$ . Then we have $Y_{11}\ge 0$ and $\mathrm {rank\,} Y_{11}\ge p+1$ , which implies $X+cY\notin U(m, p)$ for some $c\ge 0$ .▪

Theorem 6.14 Two maximal order isomorphisms $\phi _{m,p}$ and $\phi _{m',p'}$ are equivalent if and only if $m= m'$ and $p=p'$ . If $U \subset S_n$ is a matrix domain and $\phi : U \to S_n$ is an order embedding, then there exists a unique pair of nonnegative integers $p,m$ with $p \le m \le n$ such that $\phi $ is equivalent to a restriction of $\phi _{m,p}$ .

Proof Suppose that $\phi _{m,p}$ and $\phi _{m',p'}$ are equivalent. Then there exists an order automorphism of $S_n$ that maps $U(m, p)$ onto $U(m', p')$ . By Lemma 6.13, we have $n+p-m=n+p'-m'$ and $n-p=n-p'$ , and hence $m=m'$ and $p=p'$ . Thus, we have $(n+2)(n+1)/2$ equivalence classes of maximal order isomorphisms $\{ \phi _{m, p}\}_{0 \le p \le m \le n}$ . By Propositions 5.1 and 5.5, Corollary 5.6, and Theorem 6.11, we conclude that each order embedding of a matrix domain is equivalent to a restriction of $\phi _{m,p}$ for a unique pair of integers $m,p$ , $0 \le p \le m \le n$ .▪

Remark 6.15 In fact, we may prove that $\phi _{m, p}$ is equivalent to $\Phi _A$ for any $A\in S_n$ with $\mathrm {rank\,} A_+ = p$ and $\mathrm {rank\,} A_- = m-p$ . The proof is left to the reader.

Theorem 6.14 has an interesting consequence. By equation (3), every order embedding is in a sense a “corner” of the order isomorphism $X \mapsto -X^{-1}$ . Indeed, let $0 \le p \le m \le n$ , and let $\psi , \psi ' : S_n \to S_{2n-m}$ be affine order embeddings defined by

$$ \begin{align*}\psi\left(\left[ \begin{matrix} X_{11} & X_{12} \cr X_{12}^{\ast} & X_{22} \cr \end{matrix} \right]\right)= \left[ \begin{matrix} X_{11} & X_{12} & 0 \cr X_{12}^{\ast} & X_{22} & iI \cr 0 & -iI & 0 \cr \end{matrix} \right],\quad \psi'\left(\left[ \begin{matrix} X_{11} & X_{12} \cr X_{12}^{\ast} & X_{22} \cr \end{matrix} \right]\right)= \left[ \begin{matrix} X_{11} & 0 & X_{12} \cr 0 & 0 & -iI \cr X_{12}^{\ast} & iI & X_{22}\cr \end{matrix} \right]. \end{align*} $$

Then equation (3) means $\phi _{m, p}(X) = \psi ^{\prime -1}(-\psi (X)^{-1})$ , $X\in U(m, p)$ . Therefore, for any order embedding $\phi : U\to S_n$ of a matrix domain $U\subset S_n$ , there exist $0\le m\le n$ and affine order embeddings $\psi _1, \psi _2 : S_n\to S_{2n-m}$ such that $\phi (X)=\psi _2^{-1}(-\psi _1(X)^{-1})$ , $X\in U$ .

7 Applications, examples, and final remarks

7.1 Relating our main theorem to the classical Loewner’s theorem

In the first subsection, we compare our results with the classical Loewner’s theorem. To begin with, let us give the precise statement of the classical Loewner’s theorem.

Theorem 7.1 (Loewner)

Let $f: (a, b)\to {\mathbb {R}}$ be a nonconstant function on an open interval. The following are equivalent:

  1. 1. f is operator monotone.

  2. 2. f has an analytic continuation to the upper half-plane $\Pi $ which maps $\Pi $ into $\Pi $ .

  3. 3. There exist a finite measure $\mu $ on ${\mathbb {R}}\setminus (a, b)$ and constants $c\in {\mathbb {R}}$ , $d\ge 0$ such that

    (4) $$ \begin{align} f(x)= c+dx + \int_{{\mathbb{R}}\setminus (a, b)}\frac{1+xy}{y-x}\, d\mu(y). \end{align} $$

We remark that the equivalence (2) $\Leftrightarrow $ (3) is a classical fact of complex analysis that was known before Loewner’s theorem. It is not difficult to show the implication (3) $\Rightarrow $ (1) directly, but let us revisit it through the scope of our Theorem 2.2.

Proof of (3) $\Rightarrow $ (1) of Theorem 7.1 based on Theorem 2.2

Let f be defined by (4). We may think of f as a holomorphic function on $(\mathbb {C} \setminus \mathbb {R}) \cup (a,b)$ . Hence, f determines a map from ${\mathcal {U}}:=\{X\in B(H)\, :\, \sigma (X)\subset (\mathbb {C} \setminus \mathbb {R}) \cup (a,b)\}$ into $B(H)$ by holomorphic functional calculus. By standard arguments, ${\mathcal {U}}$ is open and f is a holomorphic map from ${\mathcal {U}}$ into $B(H)$ . Note that $\Pi (H)\subset {\mathcal {U}}$ . Let $X\in \Pi (H)$ . Then,

$$ \begin{align*}f(X)= cI+dX + \int_{{\mathbb{R}}\setminus (a, b)}g_X(y) \, d\mu(y), \end{align*} $$

where $g_X(y) := (y^2+1)(yI-X)^{-1} -yI$ , $y\in {\mathbb {R}}\setminus (a, b)$ . It is easy to see that $g_X(y)\in \Pi (H)$ , $y\in {\mathbb {R}}\setminus (a, b)$ . Since f is nonconstant, we have either $d>0$ or $\mu ({\mathbb {R}}\setminus (a, b))>0$ , which implies $f(X)\in \Pi (H)$ . By Theorem 2.2, f determines an order preserving map on $(aI, bI)$ , that is, f is operator monotone.▪

Therefore, taking the equivalence (2) $\Leftrightarrow $ (3) as granted, we may think of the direction from holomorphic maps to order preserving maps of the classical and our Loewner’s theorem in a unified simple manner. The essential part of Loewner’s achievement is the implication (1) $\Rightarrow $ (2), or from order preserving maps to holomorphic maps. Simon calls it the “hard direction,” and gives various proofs in [Reference Simon12]. In our result, the corresponding direction is obtained with a relatively short proof in Section 3. However, this is not at all easy: we completely rely on the formula (1) in Theorem 3.3 by the second author whose proof is quite involved.

In the next five subsections, the comments on the optimality of our results are given.

7.2 Monotonicity versus preserving order in both directions

In the paper, we have treated order embeddings of matrix domains and local order isomorphisms of operator domains, that is, maps that preserve order in both directions and maps that are locally bijective and locally preserve order in both directions, respectively. Having the classical Loewner’s theorem in mind, it is natural to ask why we did not consider maps preserving order in one direction only. The reason is that such maps may have wild behavior even under additional assumptions. For example, let us recall the fixed-dimensional version of Loewner’s theorem:

Theorem 7.2 (Loewner)

Let $2\le n<\infty $ be an integer, and let $f: (a, b)\to {\mathbb {R}}$ be a map on an open interval. The following are equivalent:

  1. 1. f is a matrix monotone function of order n, that is, f determines an order preserving map from the matrix interval $(aI, bI)\subset S_n$ into $S_n$ .

  2. 2. f is continuously differentiable, and for any n-tuple $a<\lambda _1<\cdots <\lambda _n<b$ , the Loewner matrix $(f^{[1]}(\lambda _i, \lambda _j))_{i,j}\in S_n$ is positive semidefinite, where

    $$ \begin{align*}f^{[1]}(\lambda_i, \lambda_j) = \left\{ \begin{matrix} \frac{f(\lambda_j)-f(\lambda_i)}{\lambda_j-\lambda_i}, & \mathrm{if} & i\neq j, \cr f'(\lambda_i), & \mathrm{if} & i=j. \cr \end{matrix} \right. \end{align*} $$

Even though this theorem gives an explicit and complete characterization of order preserving maps determined by functional calculus, this class of maps is still not well understood. See Chapter 14 of [Reference Simon12], in which a succinct description is explained only in the case $n=2$ .

For another class of wild examples of maps that preserve order in one direction only, take the operator domain $(0,I) \subset S(H)$ . Let $f : (0,I] \to (0, 1]\subset \mathbb {R}$ be a continuous function. Assume that for every $X,Y \in (0,I)$ we have $X \le Y \Rightarrow f(X) \le f(Y)$ . Suppose further that $f(X)=1$ for every $X \in (0,I]\setminus (0, I)$ . Then the map $\phi : (0,I) \to (0,I)$ given by $\phi (X) = f(X)X^{1/2}$ is a continuous bijective map preserving order in one direction. Indeed, since the function $g(x) = x^{1/2}$ is operator monotone on $(0,1)$ , it is trivial to verify that $\phi $ is continuous and preserves order in one direction. Define a map $\psi : (0,I) \to (0,I)$ by $\psi (X) = (f(X))^2 X = (\phi (X))^2$ , $X\in (0,I)$ . To show the bijectivity, one only needs to see that for every $X \in (0,I)$ the set $ \{ sX \, : s \in \mathbb {R} \} \cap (0,I)$ is mapped by $\psi $ bijectively onto itself. One can find a lot of rather “wild” examples of functions $f : (0,I] \to (0, 1]$ satisfying the above conditions. Moreover, we may compose arbitrary order automorphisms of $(0, I)$ from both sides of $\phi $ to obtain a wider class of examples, showing that there is no much hope to get any reasonable structural result for continuous bijections of the operator domain $(0,I)$ onto itself preserving order in one direction only.

Let us give here just one example of a function f with the condition above. Let n be a positive integer and $f_1 , \ldots , f_n : (0,1] \to (0,1]$ any surjective increasing functions. For every $x \in H$ of norm one, we choose an integer k, $1 \le k \le n$ , and set $f_x = f_k$ . Define $f : (0,I] \to (0, 1]$ by

$$ \begin{align*}f(X) = \sup_{x\in H, \| x \| = 1} \{ f_x ( \langle Xx,x \rangle ) \}. \end{align*} $$

It is easy to see that f satisfies the desired condition.

7.3 The dimensions of the underlying spaces in the finite-dimensional case

In the finite-dimensional case, we have a complete understanding of order embeddings $\phi : U \to S_n$ for every matrix domain $U \subset S_n$ . We know that there are no order embeddings $\phi : U \to S_n$ when U is a matrix domain in $S_m$ with $m> n$ . We will next show that there is almost no hope to get any reasonable structural result for order embeddings when $m < n$ . If a map $\phi : U \to S_n$ is defined by

$$ \begin{align*}\phi (X) = \left[ \begin{matrix} X & 0 \cr 0 & \varphi (X) \cr \end{matrix} \right], \end{align*} $$

where $\varphi : U \to S_{n-m}$ is any map preserving order in one direction, then clearly, $\phi $ is an order embedding. However, we already know that maps preserving order in one direction may be wild even under additional assumptions, and even under the linearity assumption (see [Reference Størmer13, Section 8]). Thus, there is no nice description of order embeddings of operator domains in $S_m$ into $S_n$ when $n> m$ . Let us just add here a remark that $\varphi $ may have the special form $\varphi (X)=\varphi _0(x_{11}) A$ , $X = (x_{ij})_{1\le i, j\le m}$ , where $\varphi _0 : \mathbb {R} \to \mathbb {R}$ can be any increasing real function, possibly noncontinuous, and possibly constant on some intervals, and $A\in S_{n-m}$ can be any positive semidefinite matrix.

7.4 Order embeddings in the infinite-dimensional case

Since each infinite-dimensional Hilbert space H can be identified with an orthogonal direct sum of two copies of H, the same idea can be used to construct wild examples of order embeddings of $S(H)$ into $S(H) \cong S(H \oplus H)$ . To make matters worse, there are other examples of wild order embeddings of $S(H)$ into $S(H)$ . Take the case when H is separable and choose an orthonormal basis $\{e_k \, : \, k \ge 1 \}$ and a countable dense subset $\{h_k \, : \, k \ge 1 \}$ in the unit ball of H. Let further $\varphi _k : \mathbb {R} \to \mathbb {R}$ , $k \ge 1$ , be any sequence of strictly increasing functions satisfying the condition that for every bounded sequence $(q_k) \subset \mathbb {R}$ the sequence $(\varphi _k (q_k))$ is bounded. Then the map $\phi : S(H) \to S(H)$ given by $\phi (X) = D_X$ , where $D_X \in S(H)$ is the “diagonal operator” defined by

$$ \begin{align*}D_X e_k = \varphi_k ( \langle X h_k , h_k \rangle ) e_k, \ \ \ k=1,2,\ldots, \end{align*} $$

is an order embedding. All these examples show that while having a full understanding of order embeddings in the finite-dimensional case, we need to work with local order isomorphisms (the local bijectivity assumption) when dealing with the infinite-dimensional setting.

7.5 Operator domains

When formulating our results, it is essential that we assume that local order isomorphisms are maps defined on operator domains, that is, open and connected subsets of $S(H)$ . Indeed, the assumption of openness is indispensable when dealing with differentiability. See also Theorem 7.4, in which a difficulty in dropping the assumption of openness can be observed. In order to see that the assumption of connectedness is essential, we can take $U= (0,I)$ and $V= (-I, 0)\cup (0,I)$ . If $\psi : (-I,0) \to (-I, 0)$ is any order automorphism, then the map $\phi : V \to V$ defined by $\phi (X) = X$ , $ X \in (0,I)$ , and $\phi (X) = \psi (X)$ , $X \in (-I,0)$ , is an order automorphism of V extending the identity automorphism of U.

7.6 Order isomorphisms versus local order isomorphisms

At first look, it might be surprising that we are dealing with local order isomorphisms rather than with order isomorphisms. First of all, the notion of local order isomorphisms appears naturally when studying an analogue of the Loewner’s theorem for maps on operator domain. Another reason is that for order isomorphisms we do not have the unique extension property. Indeed, by Zorn’s lemma, any order isomorphism between operator domains has an extension to a maximal order isomorphism. Suppose $A\in S(H)$ and both $A_+$ and $A_-$ are noncompact. We show that there exists a domain $U\subset U_A$ such that $\Phi _A$ restricts to an order isomorphism from U onto $\Phi _A(U)$ but this order isomorphism has more than one extension to maximal order isomorphisms. We may take a domain $V\subset U_A$ such that $\Phi _A$ restricts to a maximal order isomorphism from V onto $\Phi _A(V)$ . Note that $V\neq U_A$ by Theorem 5.9. Take an operator $X\in U_A\cap \partial V \,\,(\neq \emptyset )$ . We may take a domain $X\in W\subset U_A$ such that $\Phi _A$ restricts to a maximal order isomorphism from W onto $\Phi _A(W)$ . Hence, $\Phi _A$ restricted to $U:=V\cap W$ has two extensions to maximal order isomorphisms. See also [Reference Agler, McCarthy and Young1], in which a local condition is essential in giving a variant of Loewner’s theorem, too.

7.7 Unifying and extending known results

Our results unify and substantially improve all known results on order isomorphisms of operator intervals. We set $(-\infty , \infty ):=S(H)$ . Take any collection J of one of the forms

$$ \begin{align*}[A,B], \ \, (A, B), \ \, [A, B), \ \, (A ,B], \ \, (A, \infty), \ \, [A, \infty), \ \, (- \infty , A], \ \, (- \infty , A), \ \, (-\infty, \infty) \end{align*} $$

for some $A, B\in S(H)$ with $A<B$ . In [Reference Šemrl11], an explicit construction of an order isomorphism from J onto one of the five operator intervals below was constructed:

(5) $$ \begin{align} [0,I], \ \, (0, \infty), \ \, [0, \infty), \ \, (- \infty , 0], \ \, (-\infty, \infty). \end{align} $$

Moreover, it was shown that any two of (5) are not order isomorphic.

Thus, the basic theorems on order isomorphisms of operator intervals describe the general forms of order automorphisms of operator intervals (5). We already described the case $(-\infty , \infty )$ in Theorem 4.6. It has been known [Reference Molnár7, Reference Šemrl11] that for each order automorphism $\phi : J \to J$ , where J is any of the intervals

$$ \begin{align*}(0, \infty), \ \, [0, \infty), \ \, (- \infty , 0], \end{align*} $$

there exists a bounded bijective linear or conjugate-linear operator $T: H \to H$ such that

(6) $$ \begin{align} \phi (X) = TXT^{\ast} \end{align} $$

for every $X \in J$ . Let us give a proof based on our results. Suppose that $\phi $ is an order automorphism of $(0, \infty )$ . Then the map $\psi : (-I, \infty )\to (-\phi (I), \infty )$ defined by $\psi (X)=\phi (X+I)-\phi (I)$ is an order isomorphism with $\psi (0)=0$ . It follows by Theorem 4.4 that there exist $A\in S(H)$ and an invertible bounded linear or conjugate-linear operator $T: H\to H$ such that $(-I, \infty )\subset U_A$ and

$$ \begin{align*}\psi(X) = T\Phi_A(X)T^{\ast} = T(XA+I)^{-1}XT^{\ast},\quad X\in (-I, \infty). \end{align*} $$

The inclusion $(-I, \infty )\subset U_A$ implies $A\ge 0$ . Since $T^{-1}Y(T^{\ast })^{-1}\in U_{-A}$ for all $Y\in (-\phi (I), \infty )$ , we also obtain $A\le 0$ , and hence $A=0$ . This leads to the formula (6) if $J=(0, \infty )$ . Suppose that $\phi $ is an order automorphism of $[0, \infty )$ . It is not difficult to see that $\phi $ restricts to an order automorphism of $(0, \infty )$ (imitate the second paragraph of the proof of Lemma 3.2), and from this, it is an easy exercise to obtain the desired conclusion when $J=[0, \infty )$ . Since $(-\infty , 0]$ is order anti-isomorphic to $[0, \infty )$ by the map $X\mapsto -X$ , we also obtain the general form of order automorphisms of $(-\infty , 0]$ .

Therefore, for four of the intervals (5), the description of the general forms of order automorphisms is easy: all order automorphisms are congruences $X \mapsto TXT^{\ast }$ or congruences plus translations. However, in the case of the interval $[0,I]$ , we have quite a complicated formula (1) in Theorem 3.3. This description is not really satisfactory. If we denote the map $\phi $ appearing in (1) by $\phi _{p,q,T}$ , then the family of all order automorphisms of the effect algebra $[0,I]$ is parameterized by three parameters $p,q,T$ . In this description, there are too many parameters in the sense that we may have $\phi _{p,q,T} = \phi _{p',q',T'}$ when $p\not =p'$ , $q\not =q'$ , and $T \not = T'$ . Using our results, we present a better description of order automorphisms of the effect algebra.

Theorem 7.3 Assume that $\phi : [0, I] \to [0, I]$ is an order automorphism. Then there exists a bijective linear or conjugate-linear bounded operator $T: H\to H$ that is unique up to a multiplication with a complex number of modulus one such that

$$ \begin{align*}\phi (X) = T\Phi_{T^{\ast} T -I}(X)T^{\ast} = T \left( X (T^{\ast} T -I) +I \right)^{-1} X T^{\ast} \end{align*} $$

for every $X \in [0,I]$ . Conversely, for any bijective linear or conjugate-linear bounded operator $T\in B(H)$ , we have $[0, I]\subset U_{T^{\ast } T -I}$ and $\phi _T: X\mapsto T\Phi _{T^{\ast } T -I}(X)T^{\ast }$ is an order automorphism of $[0, I]$ .

Proof It follows from Lemma 3.4 that $\phi $ extends to a biholomorphic map that maps $\Pi (H)$ onto itself. By Proposition 4.1, there exist $A\in S(H)$ and a linear bounded bijection $T\in B(H)$ with either

$$\begin{align*}\begin{aligned} \phi(X) &= T(X^{-1}+A)^{-1}T^{\ast} = T(XA+I)^{-1}XT^{\ast}, \ \ \ X\in \Pi(H), \text{ or}\\ \phi(X) &= T((X^t)^{-1}+A)^{-1}T^{\ast} = T(X^t A+I)^{-1}X^t T^{\ast}, \ \ \ X\in \Pi(H). \end{aligned} \end{align*}$$

By Lemma 4.2, we have $[0, I]\subset U_A$ , and the continuity of $\phi $ implies that either $\phi (X) = T\Phi _A(X)T^{\ast }$ , $X\in [0, I]$ , or $\phi (X) = T(\Phi _{A^t}(X))^t T^{\ast }$ , $X\in [0, I]$ . Since $\phi (I)=I$ , we obtain $I=T(A+I)^{-1}T^{\ast }$ , and hence $A=T^{\ast } T-I$ . The uniqueness of T up to a multiplication with a complex number of modulus one is a consequence of Proposition 4.5.

Conversely, let $T : H \to H$ be a bijective linear or conjugate-linear bounded operator. Since $(tI) (T^{\ast } T - I) +I$ is invertible for every $t \in [0,1]$ , we have $I \in U_{T^{\ast } T -I}$ . Because $T^{\ast } T-I>-I$ , Proposition 5.7 implies $[0, I]\subset U_{T^{\ast } T -I}$ , and $\phi _T$ is an order isomorphism from $[0, I]$ onto $[0, \phi _T(I)]=[0, I]$ .▪

In the finite-dimensional case, we have a stronger result.

Theorem 7.4 Assume that $\phi : E_n \to S_n$ , $n \ge 2$ , is an order embedding. Then there exist an invertible $n \times n$ matrix T and $A, B \in S_n$ with $A> -I$ such that either

$$ \begin{align*}\phi (X) = T \left( X A +I \right)^{-1} X T^{\ast} +B, \ \ \ X \in E_n \setminus \{ 0,I \}, \end{align*} $$

or

$$ \begin{align*}\phi (X) = T \left( X^t A +I \right)^{-1} X^t T^{\ast} +B, \ \ \ X \in E_n \setminus \{ 0,I \}. \end{align*} $$

It is clear that $\phi (0)$ is a hermitian matrix satisfying $\phi (0) \le B$ and $\phi (I)$ a matrix satisfying $\phi (I) \ge T \left ( A +I \right )^{-1} T^{\ast } +B$ . Conversely, if $\phi $ is defined on the set $[0,I]\setminus \{ 0,I \}$ by one of the above two formulae, and if $\phi (0)$ and $\phi (I)$ satisfy the previous two inequalities, then $\phi : E_n \to S_n$ is an order embedding.

Lemma 7.5 Assume that $\phi : E_n \to S_n$ , $n \ge 2$ , is an order embedding. Suppose that $\phi (X) = X$ for every $X \in (0,I)$ . Then $\phi (X) = X$ for every $X \in E_n \setminus \{ 0,I \}$ .

Proof It is enough to prove that for every projection P of rank one and every real $t \in (0,1)$ we have $\phi (tP)= tP$ . Indeed, if we can prove this, then by considering the order embedding $X \mapsto I - \phi (I -X)$ we see that $\phi (I - tP) = I-tP$ , $t \in (0,1)$ . Assume that we already know this. Take any $X \in E_n$ . If $Xx = tx$ for some nonzero $x \in \mathbb {C}^n$ and some real t, $t \in (0,1)$ , then $tP \le X \le I - (1-t)P$ , where P is the projection of rank one whose range is spanned by x. Therefore, $tP \le \phi (X) \le I - (1-t)P$ , yielding that $\phi (X) x = tx$ . If $Xx = x$ for some nonzero vector x, then $X \ge tP$ , where P is the projection of rank one whose range is spanned by x and t is any real number, $0 < t < 1$ . Thus, if X has eigenvalue $1$ but $0$ is not its eigenvalue and $X\not =I$ , then with respect to a suitable orthonormal basis we have the following block matrix representations:

$$ \begin{align*}X = \left[ \begin{matrix} I & 0 \cr 0 & X_1 \cr \end{matrix} \right] \ \ \ \mathrm{and} \ \ \ \phi (X) = \left[ \begin{matrix} Y & 0 \cr 0 & X_1 \cr \end{matrix} \right], \end{align*} $$

where $Y \ge I$ and $X_1$ has all its eigenvalues in the open interval $(0,1)$ . If $Y \not =I$ , then it is easy to find a projection Q of rank one and real number $s \in (0,1)$ such that $sQ \not \le X$ , but $sQ \le \phi (X)$ , a contradiction. In a similar way, we see that if $X\not =0$ , $0$ is an eigenvalue of X, but $1$ is not an eigenvalue of X, then $\phi (X) = X$ . Finally, if both $1$ and $0$ are eigenvalues of X, then

$$ \begin{align*}(1 - \varepsilon)X = \phi ((1-\varepsilon)X) \le \phi (X) \le \phi ((1 - \varepsilon)X + \varepsilon I) = (1 - \varepsilon)X + \varepsilon I \end{align*} $$

for any positive $\varepsilon <1$ , and consequently, $\phi (X) = X$ .

It remains to verify that $\phi (tP) = tP$ for every projection P of rank one and every real $t \in (0,1)$ . Assume with no loss of generality that $P = E_{11}$ , the matrix whose all entries are zero, but the $(1,1)$ -entry that equals $1$ . From $tE_{11} \le tE_{11} + \varepsilon (I - E_{11}) = \phi ( tE_{11} + \varepsilon (I - E_{11}) )$ , we get $ C= \phi (tE_{11}) \le tE_{11}$ . In particular, $c_{11}$ , the $(1,1)$ -entry of C is no larger than t, and

(7) $$ \begin{align} \langle Cx,x \rangle \le \langle tE_{11} x, x \rangle \end{align} $$

for every $x \in \mathbb {C}^n$ . It also follows that $C \le tE_{11} + (I-E_{11})$ . We claim that $C \not < tE_{11} + (I-E_{11})$ . For if $C < tE_{11} + (I-E_{11})$ then there would exist a positive real number $\delta <t$ such that

$$ \begin{align*}\phi (tE_{11}) = C \le (t- \delta) E_{11} + (1 - \delta) (I - E_{11}) = \phi ( (t- \delta) E_{11} + (1 - \delta) (I - E_{11}) ) \end{align*} $$

yielding $tE_{11} \le (t- \delta ) E_{11} + (1 - \delta ) (I - E_{11})$ , a contradiction. Thus, there exists a unit vector y such that

$$ \begin{align*}\langle tE_{11} y , y \rangle + \langle (I-E_{11}) y , y \rangle = \langle Cy,y \rangle. \end{align*} $$

Since $I- E_{11}$ is positive, we get from (7) that $ \langle (I-E_{11}) y , y \rangle =0$ implying that $y = be_{1}$ for some complex number b of modulus one. Here, $e_1$ is the first standard basis vector. Hence, $c_{11} = t$ which together with $ C \le tE_{11}$ yields that

$$ \begin{align*}C = \left[ \begin{matrix} t & 0 \cr 0 & C_1 \end{matrix} \right] \end{align*} $$

with $C_1 \le 0$ . We need to show that $C_1 = 0$ . If not, then we can easily find $X \in (0,I)$ such that $X \ge C$ but $X \not \ge tE_{11}$ , a contradiction.▪

Corollary 7.6 Let $A,B \in S_n$ satisfy $A < B$ . Assume that $\phi : [A,B] \to S_n$ , $n \ge 2$ , is an order embedding. Suppose that $\phi (X) = X$ for every $X \in (A,B)$ . Then $\phi (X) = X$ for every $X \in [A,B] \setminus \{ A,B \}$ .

Proof Trivial.▪

Proof of Theorem 7.4

Theorem 6.11 yields that the restriction $\phi : (0,I) \to S_n$ is a local order isomorphism. Thus, there exists a unique extension of $\phi |_{(0, I)}$ to a maximal (local) order isomorphism $\Phi : U\to S_n$ . Since $ \phi (0) \le \phi (X) \le \phi (I)$ for every $X \in (0, I)$ , we have $\| \phi (X) \| \le M$ , $X \in (0, I)$ , for some positive real number M. Thus, Lemma 4.2 implies $[0,I] \subset U$ . By Theorem 4.4, we conclude that there exist a bijective linear or conjugate-linear bounded operator $T : H \to H$ and $A,B \in S(H)$ such that $[0, I]\subset U_A$ and $\Phi (X) = T \left ( X A +I \right )^{-1} X T^{\ast } +B$ for every $X \in U$ . By Proposition 5.7, we obtain $A>-I$ . We know that $\Phi ([0,I]) = [\Phi (0) , \Phi (I)]$ and that $\Phi ((0,I)) = (\Phi (0), \Phi (I))$ .

Clearly, $\psi = \phi \circ \Phi ^{-1} : [\Phi (0) , \Phi (I) ] \to S_n$ is an order embedding. Moreover, $\psi (X) = X$ for every $X \in (\Phi (0) , \Phi (I) )$ . It follows from Corollary 7.6 that $\phi ( \Phi ^{-1} (X) ) = X$ for every $X \in [\Phi (0) , \Phi (I) ] \setminus \{ \Phi (0) , \Phi (I) \}$ , or equivalently, $\phi (X) = \Phi (X)$ for every $X \in [0, I] \setminus \{ 0, I \}$ .▪

Acknowledgment

The authors are grateful to Éric Ricard for making them aware of reference [Reference Harris3].

Footnotes

The second author was supported by grants N1-0061, J1-8133, and P1-0288 from the ARRS, Slovenia.

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