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A note on the column–row property

Published online by Cambridge University Press:  24 April 2023

Samya Kumar Ray
Affiliation:
Stat-Math Unit, Indian Statistical Institute Kolkata, BT Road, Kolkata 700108, India e-mail: [email protected]
Srijan Sarkar*
Affiliation:
Department of Mathematics, Indian Institute of Science, CV Raman Road, Bangalore 560012, India
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Abstract

In this article, we study the following question asked by Michael Hartz in a recent paper (Every complete Pick space satisfies the column-row property, to appear in Acta Mathematica): which operator spaces satisfy the column–row property? We provide a complete classification of the column–row property (CRP) for noncommutative $L_{p}$-spaces over semifinite von Neumann algebras. We study other relevant properties of operator spaces that are related to the CRP and discuss their existence and nonexistence for various natural examples of operator spaces.

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Article
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This is an Open Access article, distributed under the terms of the Creative Commons Attribution licence (https://creativecommons.org/licenses/by/4.0/), which permits unrestricted re-use, distribution, and reproduction in any medium, provided the original work is properly cited.
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© The Author(s), 2023. Published by Cambridge University Press on behalf of The Canadian Mathematical Society

1 Introduction

In [Reference Trent24], while studying the Corona problem for Dirichlet spaces on the unit disk $\mathbb {D}$ , the author discovered an important property involving the corresponding multiplier algebra, which in recent times, is known as the column–row property (CRP). The CRP has emerged as an important tool in extending classical results on Hardy spaces to complete Nevanlinna–Pick (cnp) spaces. In a remarkable recent work [Reference Hartz8], Hartz showed that every normalized cnp space has the CRP with constant $1$ . The notion of CRP has led to a plethora of important results for cnp spaces, to name a few: (a) factorization for weak-product spaces; (b) interpolating sequences; (c) Corona problem, etc. (see [Reference Alexandru, Hartz, McCarthy and Richter1, Reference Alexandru, Hartz, McCarthy and Richter2, Reference Clouatre and Hartz5, Reference Hartz8, Reference Trent24]). Motivated by the inherent operator space structure of multiplier algebras and the immense application of this property, Hartz asked the following question in [Reference Hartz8].

Question Which operator spaces satisfy the column–row property?

Our aim in this article is to initiate a study for this question in the general setting of operator spaces, by looking at several examples. For the theory of operator spaces and related important results, we refer to the excellent monographs [Reference Effros and Ruan6, Reference Paulsen13, Reference Pisier16]. Let us begin with the description of CRP by considering a concrete operator space $E \subseteq B(\mathcal {H})$ . For a sequence ${\mathbf e}:=(e_1,\dots ,e_n)$ in $E,$ we define the column operator $C_{{\mathbf e}} :\mathcal H\to \mathcal H^n$ by $C_{{\mathbf e}}(\zeta ):=[e_1(\zeta ),\dots ,e_n(\zeta )],\ \zeta \in \mathcal H.$ Similarly, let us define the corresponding row operator $R_{{\mathbf e}}:\mathcal H^n\to \mathcal H $ by $ R_{\mathbf {e}}([ \zeta _1,\dots ,\zeta _n]):=\sum _{j=1}^ne_j(\zeta _j). $

Definition 1.1 A concrete operator space $E\subseteq B(\mathcal H)$ is said to have the CRP if there exists a constant $C>0$ such that for any finite sequence ${\mathbf e}$ in E with $\|C_{{\mathbf e}}\|_{\mathcal {H}\to \mathcal {H}^n}\leq 1$ we have $\|R_{{\mathbf e}}\|_{\mathcal {H}^n\to \mathcal {H}}\leq C.$

We refer Ruan's characterization (Theorem 3.1, Reference Ruan[19]) for an equivalent condition using matrix norms. In this article, we obtain the following characterization for CRP for noncommutative $L_p$ -spaces.

Theorem 1.1 Let ${\mathcal M}$ be a semifinite von Neumann algebra. Let $1\leq p\neq 2\leq \infty .$ Then $L_p({\mathcal M})$ has CRP if and only if ${\mathcal M}$ is subhomogeneous.

Moreover, we show that if $L_p({\mathcal M})$ has CRP with constant $1$ for some $p\in [1,\infty )\backslash \{2\}$ , then ${\mathcal M}$ must be an abelian von Neumann algebra. In the case of $p=2$ , it is well known that $L_2({\mathcal M})$ is an operator Hilbert space [Reference Pisier16, p. 139] and any operator Hilbert space is completely isometric to its opposite [Reference Pisier16, Exercise 7.1, p. 146] (see also [Reference Fidaleo7, Footnote 8, p. 246]). Moreover, using the description of the matricial norms, it is a straightforward observation that any operator Hilbert space satisfies a stronger condition that is, the column-matrix property (CMP) with constant 1 (see Lemma 2.3). We provide a short explanation of this fact along with some related results just after Remark 3.5.

Note that Hartz proved a stronger result by showing that cnp spaces satisfy the CMP [Reference Hartz8, Corollary 3.6]. Motivated by these results, we study the CMP for operators spaces via some naturally occurring examples. We also introduce the completely bounded version of CRP and CMP. It was shown in [Reference Hartz8, Section 5.1] that normalized cnp spaces do not have completely bounded CRP with constant $1.$ However, it turns out that no nontrivial operator space can have completely bounded CRP. We also discuss CRP for many naturally occurring operator spaces including $C^*$ -algebras.

Here, we would like to point out that the operator spaces we have mainly considered are self-adjoint. Thus, this situation is different from the study of the CRP of multiplier algebras of rkHs, which are very much asymmetrical in nature. We thank the anonymous reviewer for this remark. The main advantage that self-adjointness brings into the problem is the concept of subhomogeneity. It allows us to form a line of thought where if subhomogeneity fails then the operator space contains certain matrix algebras, where we can study the CRP by means of computation of norms. However, these computations are not straightforward and are obtained via nontrivial estimate of the norm of certain matrix-valued rows and columns. The main difficulty for establishing Theorem 1.1 lies in the fact that the operator space structure of noncommutative $L_p$ -spaces are difficult to work with. To overcome this difficulty, we first compute the norm of a column with certain entries coming from $S_2.$ Here, we use the operator Hilbert space structure of $S_2$ and the description of the norm given by Pisier in [Reference Pisier14]. Following this, we get an upper bound for the norm of the column by using the method of complex interpolation. Then by exhibiting lower bounds of the rows, we obtain the desired estimates for $p>2.$ The approach for the case of $p<2$ differs in the following manner: here, we estimate norms of columns with entries from $S_1$ . This is done using certain duality relationship between noncommutative vector valued $L_p$ -spaces which was developed by Pisier in [Reference Pisier15].

Let us now briefly discuss the manner in which the rest of the article has been organized. Section 2 contains the characterization of CRP for noncommutative $L_p$ -spaces. In Section 3, we have studied CRP and CMP and their completely bounded versions for some natural examples of operator spaces.

2 Column–row property for noncommutative $L_p$ -spaces

We begin with some preliminaries of operator space theory. For various well-known concepts related to the operator space theory, we refer to [Reference Effros and Ruan6, Reference Pisier16].

Let E be an operator space equipped with a matricial norm structure $(M_n(E), \|.\|_{M_n(E)})_{n\geq 1}$ . Given $x=[x_{ij}]_{i,j=1}^n\in M_n(E)$ , we denote the transpose map by $ t(x):=[x_{ji}]_{i,j=1}^n.$ The transpose maps taking columns to rows or rows to columns are also denoted by $t.$ Sometimes, we also denote it by $t_n$ to specify the dimension of the spaces under consideration. The opposite operator space, $E^{op}$ is defined to be the same space as E, but with the following matricial norm: $\|[x_{ij}]_{i,j=1}^n\|_{M_n(E^{op})}:=\|[x_{ji}]_{i,j=1}^n\|_{M_n(E)}$ , for all $[x_{ij}]_{i,j=1}^n\in M_n(E^{op})$ . For an operator space E, we denote the conjugate operator space by $\overline {E}$ . Any element $x\in E$ corresponds to an element $\overline {x}\in \overline {E}.$ We refer [Reference Pisier16, Section 2.9] for the notion of conjugate operator space. Recall that a linear map $u:E\to F$ between operator spaces is called completely bounded if $\sup \limits _{n\geq 1}\|id_{M_n}\otimes u\|_{M_n(E)\to M_n(F)}<\infty ,$ where $id_E:E\to E$ is the identity map for any vector space E. In this case, one denotes $\|u\|_{cb}:=\sup \limits _{n\geq 1}\|id_{M_n}\otimes u\|_{M_n(E)\to M_n(F)}.$ The map u is called a complete isometry if $id_{M_n}\otimes u$ is an isometry for all $n\geq 1.$ The Hilbert space tensor product of two Hilbert spaces $\mathcal H$ and $\mathcal K$ is denoted by $\mathcal H\otimes _2\mathcal {K}.$ Let A and B be $C^*$ -algebras with faithful representations $\pi _{\mathcal {H}}$ and $\pi _{\mathcal {K}}$ into $B(\mathcal H)$ and $B(\mathcal K)$ , respectively. Note that by natural identification $\pi _{\mathcal H}(A)\otimes \pi _{\mathcal K}(B)$ and hence $A\otimes B$ can be identified as a subalgebra of $B(\mathcal {H}\otimes _2\mathcal K)$ . The minimal tensor product of A and B is defined to be the completion of the algebraic tensor product $A\otimes B$ with norm borrowed from $B(\mathcal {H}\otimes _2\mathcal K)$ and is denoted by $A\otimes _{\text {min}}B$ . It is well known that the $C^*$ -algebra $A\otimes _{\text {min}}B$ thus obtained is independent of the representations $\mathcal {\pi }_{\mathcal H}$ and $\mathcal {\pi }_{\mathcal K}.$ We denote by $I_n$ to be the identity matrix in $M_n.$ We need the following lemma.

Lemma 2.1 Let E be an operator space. Then E has CRP if and only if there exists a constant $C>0$ such that for all $n\geq 1$ , $\|t_n\otimes id_E\|_{M_{n,1}\check {\otimes }E\to M_{1,n}\check {\otimes }E}\leq C,$ where $\check {\otimes }$ denotes the operator space injective tensor product.

Proof From [Reference Effros and Ruan6, Corollary 8.1.3], we note that $M_{m,n}(E) = M_{m,n}\check {{\otimes }}E $ , where $\check {\otimes }$ denotes the operator space injective tensor product of operator spaces.

If A is a $C^*$ -algebra, then let us fix a faithful $*$ -representation of A on ${B}(\mathcal {H})$ . The canonical operator space structure on A is obtained by borrowing the matricial structure from ${B}(\mathcal {H})$ , and we will be using this canonical structure in the sequel. A $C^*$ -algebra A is called n-subhomogeneous if all the irreducible representations of A have dimensions at most $n.$ A $C^*$ -algebra is called subhomogeneous if it is n-subhomogeneous for some $n\in \mathbb N.$ Given a von Neumann algebra $({\mathcal M},\tau )$ with normal faithful semifinite trace $\tau $ , let $L_p({\mathcal M},\tau )$ be the corresponding noncommutative $L_p$ -space for $0<p<\infty $ . One denotes $L_{\infty }({\mathcal M})={\mathcal M}.$ When $({\mathcal M},\tau )=(B(\mathcal H),Tr)$ with $Tr$ being the natural trace on $B(\mathcal H),$ the corresponding noncommutative $L_p$ -spaces are called the Schatten-p classes and are denoted by $S_p(\mathcal H)$ for $1\leq p<\infty .$ The space $S_{\infty }(\mathcal H)$ is the space of all compact operators on $\mathcal H.$ These spaces are denoted by $S_p$ and $S_p^n$ when $\mathcal H$ is $\ell _2$ or $\ell _2^n$ , respectively, for $1\leq p\leq \infty .$ We often identify ${B}(\ell _2^n)$ with $M_n$ . Note that if ${\mathcal M}$ is a von Neumann algebra with a normal faithful semifinite trace $\tau $ , $M_n({\mathcal M})$ is again a von Neumann algebra equipped with the canonical tensor trace $Tr\otimes \tau $ . Indeed, we have a canonical identification of $M_n({\mathcal M})$ with the von Neumann algebra $M_n\overline {\otimes }{\mathcal M}$ , where $M_n\overline {\otimes }{\mathcal M}$ is the von Neumann algebra tensor product of $M_n$ and ${\mathcal M}.$ Then $Tr\otimes \tau (\sum _{i=1}^Na_i\otimes x_i):=\sum _{i=1}^NTr(a_i)\tau (x_i)$ extends to a normal faithful semifinite trace on $M_n\overline {\otimes }{\mathcal M}$ , where $a_i\in M_n$ and $x_i\in {\mathcal M}$ are positive elements for all $1\leq i\leq N$ and $N\geq 1.$ Equivalently, for any positive $x\in M_n({\mathcal M})$ , we have $Tr\otimes \tau (x)=\sum _{i=1}^n\tau (x_{ii}).$ Equipped with the canonical operator space structures $({\mathcal M}_{*}, {\mathcal M})$ becomes an interpolation couple (see [Reference Fidaleo7] and [Reference Pisier16, Section 2.7 and Chapter 7]), where $\mathcal {M}_{*}$ is the predual of ${\mathcal M}.$ We identify the predual ${{\mathcal M}}_{*}$ with $L_1({\mathcal M})$ via the map $\phi :L_1({\mathcal M})\to {{\mathcal M}}_{*}$ as $\phi (y)(x):=\tau (xy)$ for all $y\in L_1({\mathcal M})$ and $x\in {\mathcal M}.$ Moreover, $L_1({\mathcal M})$ has a natural operator space structure induced by ${\mathcal M}_{*}$ (see [Reference Pisier16, p. 139]). We have the following description of the operator space structure of $L_p({\mathcal M},\tau )$ from the convention established in [Reference Pisier16]. For $x\in M_n(L_p({\mathcal M},\tau )),$ we have, for all $1\leq p\leq \infty $ ,

(2.1) $$ \begin{align} \|x\|_{M_n(L_p({\mathcal M},\tau))}=\sup\{\|axb\|_{L_p(M_n({\mathcal M} ))}:\|a\|_{S_{2p}^n}\leq 1 \ \|b\|_{S_{2p}^n}\leq 1\}, \end{align} $$

where $axb$ is the usual product of matrices. It follows from [Reference Pisier15, Lemma 1.7] that, for a map $u:L_{p}({\mathcal M})\to L_p(\mathcal N)$ , we have $\|u\|_{cb, L_p({\mathcal M})\to L_p(\mathcal N)}=\|id_{S_p^n}\otimes u\|_{L_p(M_n\overline {\otimes }{\mathcal M})\to L_p(M_n\overline {\otimes }\mathcal N)}.$ Moreover, u is a complete isometry iff $id_{S_p^n}\otimes u$ is an isometry for all $n\geq 1.$ We refer [Reference Takesaki21] for the general theory of von Neumann algebras along with the notions of trace and tensor products of von Neumann algebras. We refer [Reference Pisier and Xu17, Reference Terp22] for noncommutative $L_p$ -spaces.

Remark 2.2. Note that the norm on $M_n(L_p({\mathcal M}))$ is very different from $L_p(M_n\overline {\otimes }{\mathcal M})$ as can be seen from our computations in the proof of Theorem 2.6.

We will now introduce a class of operator spaces which is important for this article. Following [Reference Pisier14, Theorem 1.1] (see also [Reference Pisier16, Theorem 7.1]), we can give the following definition of an operator Hilbert space denoted by $OH(I)$ .

Definition 2.1 For any index set I, there always exists an unique operator space $OH(I)$ (up to complete isometry) such that the following properties are satisfied:

  1. (i) $OH(I)$ is isometric to $\ell _2(I)$ as a Banach space.

  2. (ii) The canonical identification between $\ell _2(I)$ and $\overline {\ell _2(I)^*}$ induces a complete isometry from $OH(I)$ to $\overline {OH(I)^*}$ .

This unique operator space $OH(I)$ is known as the operator Hilbert space. Moreover, if $\mathcal K$ is a Hilbert space and $(T_i)_{i\in I}$ is any orthonormal basis of $OH(I)$ , then for any finitely supported family $(x_i)_{i\in I}$ in $B(\mathcal K)$ , we have that

$$\begin{align*}\Big\|\sum_{i\in I}x_i\otimes T_i\Big\|_{\text{min}}=\Big\|\sum_{i\in I}x_i\otimes \overline{x_i}\Big\|_{\text{min}}^{\frac{1}{2}},\end{align*}$$

where $\|.\|_{\text {min}}$ denotes the norm of minimal tensor product between $C^*$ -algebras.

Thus, for any $[x_{ij}]_{i,j=1}^n\in M_n(OH(I))$ , we have

(2.2) $$ \begin{align} \Big\|[x_{ij}]_{i,j=1}^n\Big\|_{M_n(OH(I))}=\Big\|\Big[ [\langle x_{ij}, x_{kl}\rangle]_{k,l=1}^n \Big]_{i,j=1}^n\Big\|^{\frac{1}{2}}_{M_{n^2}} \end{align} $$

(see, for instance, [Reference Fidaleo7, Proposition 1] and [Reference Pisier16, Exercise 7.5] for a proof). Since $L_2({\mathcal M})$ is completely isometrically isomorphic to an operator Hilbert space [Reference Pisier16, p. 139] (also see [Reference Pisier16, p. 125]), we can describe the matricial structure of $L_2({\mathcal M})$ by the same formula as (2.2) for any $[x_{ij}]_{i,j=1}^n\in M_n(L_2({\mathcal M}))$ with the inner product $\langle x,y\rangle :=\tau (xy^*)$ for all $x,y\in L_2({\mathcal M}).$ It is well known that $\|id_{OH(I)}\|_{cb,OH(I)\to OH(I)^{op}}=1$ (see [Reference Fidaleo7]). We state the following lemma without giving the straightforward proof.

Lemma 2.3 Let $a_i\in OH(I)$ , $1\leq i\leq n.$ Then $\|[a_1\dots a_n]^t\|_{M_{n,1}(OH(I))}= \Big (\sum _{i,j=1}^n|\langle a_i,a_j\rangle |^2\Big )^{\frac {1}{4}}.$

In the sequel, we shall frequently use the following block matrices for proving our results.

$$\begin{align*}A_n: = \begin{bmatrix} E_{11} & E_{12} & \dots & E_{1n}\\ 0 & 0 & \dots & 0\\ \vdots & \vdots & \ddots & \vdots\\ 0 & 0 & \dots & 0 \end{bmatrix}_{n \times n}; \quad B_n: = \begin{bmatrix} E_{11} & E_{21} & \dots & E_{n1}\\ 0 & 0 & \dots & 0\\ \vdots & \vdots & \ddots & \vdots\\ 0 & 0 & \dots & 0 \end{bmatrix}_{n \times n}. \end{align*}$$

Now, let us record a straightforward observation that will be useful in the sequel.

Lemma 2.4 Let $1\leq p<\infty .$ Then $\| A_n \|_{S_p^{n^2}}=\sqrt {n}\ \text {and}\ \|B_n\|_{S_p^{n^2}}=n^{\frac {1}{p}}.$

Lemma 2.5 Let $y=[y_{kl}]_{k,l=1}^n\in M_n(S_{\infty }^n)$ such that $\|y\|_{M_n(S_{\infty }^n)}\leq 1.$ Then, for all $a\in S_2^n$ with $\|a\|_2\leq 1,$ we have

$$\begin{align*}\sum_{l=1}^n\Big|\sum_{j,k=1}^na_{jk}y_{j1}^{kl}\Big|^2\leq 1, \end{align*}$$

where $y_{kl}=[y_{ij}^{kl}]_{i,j=1}^n.$

Proof Note that $z=[z_{lk}]_{l,k=1}^n$ has norm $\leq 1,$ where $z_{lk}=y_{kl}^*.$ For all $1\leq k \leq n$ , consider $v_k:=(v_{1k}, \ldots , v_{nk})\in \ell _2^n$ such that $\|v\|_{\ell _2^{n^2}}\leq 1$ , where $v:=(v_1,\ldots ,v_n).$ Note that we must have $\|zv\|_{\ell _2^{n^2}}^2\leq 1$ as well. Hence, we get

(2.3) $$ \begin{align} \sum_{l=1}^n\Big\|\sum_{k=1}^nz_{lk}v_k\Big\|^2\leq 1. \end{align} $$

Note that $z_{lk}v_k=(\sum _{j=1}^nz_{ij}^{lk}v_{jk})_{i=1}^n$ , where $z_{lk} = [z_{ij}^{lk}]_{i,j=1}^n$ . Therefore, we get $\sum _{k=1}^nz_{lk}v_k=(\sum _{k=1}^n\sum _{j=1}^nz_{ij}^{lk}v_{jk})_{i=1}^n$ . Thus, from equation 2.3, we obtain that

$$\begin{align*}\sum_{l=1}^n\sum_{i=1}^n\Big|\sum_{k=1}^n\sum_{j=1}^nz_{ij}^{lk}v_{jk}\Big|^2\leq 1. \end{align*}$$

Fixing $i=1$ in the above inequality, we get $ \sum _{l=1}^n\Big |\sum _{k=1}^n\sum _{j=1}^nz_{1j}^{lk}v_{jk}\Big |^2\leq 1. $ Rewriting we get $\sum _{l=1}^n\Big |\sum _{k=1}^n\sum _{j=1}^ny_{j1}^{kl}\overline {v_{jk}}\Big |^2\leq 1.$ Putting $\overline {v_{jk}}=a_{jk}$ for $1\leq j,k\leq n$ , we obtain the desired inequality.

Lemma 2.6 Let $1\leq p\neq 2\leq \infty .$ Then $\|t_n\otimes id_{S_p^n}\|_{M_{n,1}\check {\otimes }S_p^n\to M_{1,n}\check {\otimes }S_p^n}\geq n^{\frac {|p-2|}{2p}}.$

Proof Let us fix $2<p<\infty $ and consider $A_n \in M_n(S_p^n).$ Then by choosing

(2.4) $$ \begin{align} a=E_{11}; \quad \ b=n^{-\frac{1}{2p}}I_n, \end{align} $$

in the formula (2.1), we have the estimate $\|A_n\|_{M_n(S_p^n)}\geq \|a A_n b\|_{L_p(M_n(B(\ell _2^n)))}.$ By this and Lemma 2.4, we obtain that $\|A_n\|_{M_n(S_p^n)}\geq n^{-\frac {1}{2p}}\|A_n\|_{S_p^{n^2}}=n^{\frac {1}{2}-\frac {1}{2p}}=n^{\frac {1}{2p^{\prime }}},$ where $\frac {1}{p}+\frac {1}{p^{\prime }}=1.$

Now, we shall estimate $\|t(A_n)\|_{M_n(S_p^n)}$ . We know that $\|t(A_n)\|_{M_n(B(\ell _2^n))}=1.$ We start with calculating $\|t(A_n)\|_{M_n(S_2^n)}$ . Note that the operator space structure of $S_2^n$ agrees with the operator Hilbert space structure [Reference Fidaleo7]. Therefore, by [Reference Pisier16, Theorem 7.1] and Lemma 2.3, we get

(2.5) $$ \begin{align} \|t(A_n)\|_{M_n(S_2^n)}=\left(\sum_{i=1}^n\sum_{j=1}^n|\langle E_{1i},E_{1j}\rangle|^2\right)^{\frac{1}{4}}=\left(\vphantom{\sum_{j=1}^n}\sum_{i=1}^n|\langle E_{1i},E_{1i}\rangle|^2\right)^{\frac{1}{4}}=n^{\frac{1}{4}}. \end{align} $$

Now, we shall use the method of complex interpolation (for reference, see [Reference Bergh and Löfström3, Chapter 4, p. 87] and [Reference Pisier16, Section 2.7, p. 52]). Consider $\theta \in (0,1)$ be such that $\frac {1}{p} = \frac {\theta }{2}+0$ . Thus, we get

$$\begin{align*}\|t(A_n)\|_{M_n(S_p^n)}\leq (n^{\frac{1}{4}})^{\frac{2}{p}} = n^{\frac{1}{2 p}}. \end{align*}$$

Hence, we obtain the estimate

$$\begin{align*}\frac{\|A_n\|}{\|t(A_n)\|}\geq\frac{n^{\frac{1}{2p^{\prime}}}}{n^{\frac{1}{2p}}}=n^{\frac{p-2}{2p}}.\end{align*}$$

Now, we will study the case for $p \in [1,2)$ , for which let us consider $B_n \in M_n(S_p^n).$ Note that by choosing a and b as in (2.4) in the formula (2.1), we have the estimate $\|B_n\|_{M_n(S_p^n)}\geq \|aB_nb\|_{L_p(M_n(B(\ell _2^n)))}= n^{\frac {1}{2p}}.$ Now, let us estimate $\|t(B_n)\|_{M_n(S_p^n)}.$ To do this, we use the method of complex interpolation again. It is easy to see that $ \| t(B_n) \|_{M_n(S_1^n)}=\|A_n\|_{M_n(S_1^n)}$ . For the sake of computation, let us denote the latter block matrix by $\boldsymbol {z}:=(z_{ij})_{i,j=1}^n$ , that is, $z_{1i}=E_{1i}$ fo $1\leq i\leq n$ and $z_{ij}=0$ for $i\geq 2.$

Now, we will estimate $\|\boldsymbol {z}\|_{M_n(S_1^n)}.$ Following the method of [Reference Pisier15, Lemma 1.7], we get that $ \|\boldsymbol {z}\|_{M_n[S_1^n]} = \sup \{ \|a \cdot [z_{ij}] \cdot b \|_{S_1^n[S_1^n]}: a,b \in S_{2}^n, \|a\|_{S_2^n}, \|b\|_{S_2^n} \leq 1\}. $ Using the fact, $M_n[S_1^n]^* = S_1^n[S_{\infty }^n]$ and [Reference Pisier15, Theorem 1.5], we observe that

$$\begin{align*}\|\boldsymbol{z}\|_{M_n(S_1^n)} = \sup \left\{ \big | \langle [z_{ij}], a \cdot [y_{ij}] \cdot b \rangle \big | : a,b \in S_{2}^n, \|a\|_{S_2^n}, \|b\|_{S_2^n}, \|[y_{ij}]\|_{M_n[S_{\infty}^n]} \leq 1\right\}. \end{align*}$$

Now, $ a\cdot [y_{ij}] \cdot b = a \cdot [\sum _{l=1}^n y_{il}b_{lj}]_{i,j=1}^n = [\sum _{k=1}^n a_{ik} (\sum _{l=1}^n y_{kl} b_{lj})]_{i,j=1}^n = [\sum _{k,l=1}^n a_{ik} y_{kl} b_{lj}]_{i,j=1}^n $ . By definition,

$$ \begin{align*} \langle [z_{ij}], a \cdot [y_{ij}] \cdot b \rangle = \sum_{i,j=1}^n \left\langle z_{ij}, \sum_{l,k=1}^n a_{jk} y_{kl} b_{li} \right\rangle = \sum_{i,j,k,l=1}^n a_{jk} \langle z_{ij}, y_{kl} \rangle b_{li}. \end{align*} $$

Hence,

$$\begin{align*}\|\boldsymbol{z}\|_{M_n(S_1^n)} = \sup \left\{ \left | \sum_{i,j,k,l=1}^n a_{jk} \langle z_{ij}, y_{kl} \rangle b_{li}\right | : a,b \in S_{2}^n, \|a\|_{S_2^n}, \|b\|_{S_2^n}, \|[y_{ij}]\|_{M_n[S_{\infty}^n]} \leq 1\right\}. \end{align*}$$

Therefore, from the definition of $\boldsymbol {z}$ , we get

$$\begin{align*}\|\boldsymbol{z}\|_{M_n(S_1^n)} = \sup \left\{\left | \sum_{j,k,l=1}^n a_{jk} \langle E_{1j}, y_{kl} \rangle b_{l1} \right | : a,b \in S_{2}^n, \|a\|_{S_2^n}, \|b\|_{S_2^n}, \|[y_{ij}]\|_{M_n[S_{\infty}^n]} \leq 1\right\}. \end{align*}$$

Now, $ \langle E_{1j}, y_{kl} \rangle = y_{j1}^{kl}$ , where $y_{kl}=[y_{ij}^{kl}]_{i,j=1}^n$ and, therefore,

$$ \begin{align*} \|\boldsymbol{z}\|_{M_n(S_1^n)} &= \sup \left\{ \left | \sum_{j,k,l=1}^n a_{jk} y_{j1}^{kl} b_{l1} \right | : a,b \in S_{2}^n, \|a\|_{S_2^n}, \|b\|_{S_2^n}, \|[y_{ij}]\|_{M_n[S_{\infty}^n]} \leq 1\right\}\\ &= \sup \left\{ \left(\sum_{l=1}^n \left| \sum_{j,k=1}^n a_{jk}y_{j1}^{kl} \right|^2\right)^{\frac{1}{2}} : a \in S_{2}^n, \|a\|_{S_2^n}, \|[y_{ij}]\|_{M_n[S_{\infty}^n]} \leq 1\right\}, \end{align*} $$

where the last equality is obtained by taking supremum over $\|b\|_{S_2^n} \leq 1$ . Now using Lemma 2.5, we obtain $\|\boldsymbol {z}\|_{M_n[S_1^n]}\leq 1$ and thus, $\|t(B_n)\|_{M_n[S_1^n]} \leq 1$ . If we do computations in a manner similar to condition (2.5), we get $\|t(B_n)\|_{M_n[S_2^n]} = n^{\frac {1}{4}}$ . Therefore, by the method of complex interpolation, we get $ \|t(B_n)\|_{M_n[S_p^n]}\leq n^{\frac {1}{2p^{\prime }}} \quad (1\leq p<2). $ Thus, by combining all the facts obtained above for any $p \in [1,2)$ , we get

(2.6) $$ \begin{align} \frac{\|B_n\|}{\|t(B_n)\|}\geq\frac{n^{\frac{1}{2p}}}{n^{\frac{1}{2p^{\prime}}}}=n^{\frac{2-p}{2p}}. \end{align} $$

This completes the proof.

Remark 2.7. Let $1\leq p\neq 2\leq \infty .$ In view of [Reference Le Merdy and Zadeh11, Lemma 5.3] and Lemma 2.6, we have the estimate $n^{\frac {|p-2|}{2p}}\leq \|t_n \otimes id_{S_p^n}\|_{M_{n,1}\check {\otimes }S_p^n\to M_{1,n}\check {\otimes }S_p^n}\leq n^{\frac {|p-2|}{p}}.$ We believe that the lower bound is actually sharp.

Remark 2.8. Let E be an operator space. Then we have the following general estimate:

$$ \begin{align*} \|t_n\otimes id_{E}\|_{M_{n,1}\check{\otimes}E\to M_{1,n}\check{\otimes}E} &\leq \|t_n\otimes id_{E}\|_{cb,M_{n,1}\check{\otimes}E\to M_{1,n}\check{\otimes}E} \\ &\leq\|t_n\|_{cb,M_{n,1}\to M_{1,n}}\|id_{E}\|_{cb,E\to E}\leq\sqrt{n}. \end{align*} $$

In the above, we have used the estimate $\|t_n\|_{cb,M_{n,1}\to M_{1,n}}=\sqrt {n}$ (see [Reference Pisier16, p. 22]).

We are now ready to prove Theorem 1.1 in the following manner.

Proof See Theorem 3.3 for $p=\infty .$ Let $p\neq \infty .$ Let ${\mathcal M}$ be subhomogeneous. Then it follows from [Reference Le Merdy and Zadeh10, Lemma 4.4] that $L_p({\mathcal M})$ has CRP. For the converse, let us assume that ${\mathcal M}$ is not subhomogeneous. Then by [Reference Le Merdy and Zadeh10, Lemma 2.1] it follows that, for all $n\geq 1$ , there is a complete isometry from $S_p^n$ into $L_p({\mathcal M}).$ Hence, by Lemma 2.6 and Lemma 2.1, $L_p({\mathcal M})$ cannot have CRP for $p\neq 2.$ This completes the proof of the theorem.

Proposition 2.9 Let ${\mathcal M}$ be a semifinite von Neumann algebra. Let $1\leq p\neq 2\leq \infty $ . If $L_p({\mathcal M})$ has CRP with constant $1$ then ${\mathcal M}$ must be an abelian von Neumann algebra.

Proof See Theorem 3.3 for $p=\infty .$ Note that by Theorem 1.1, it follows that ${\mathcal M}$ must be subhomogeneous. By [Reference Le Merdy and Zadeh10, Lemma 2.1] if ${\mathcal M}$ is not subhomogeneous of degree $1,$ it contains $S_p^2$ completely isometrically. Therefore, by Lemma 2.6, we have the estimate $\|t_n\otimes id_{S_p^2}\|_{M_{2,1}\check {\otimes }S_p^2\to M_{1,2}\check {\otimes }S_p^n}\geq 2^{\frac {|p-2|}{2p}}>1.$ This shows that ${\mathcal M}$ must be subhomogeneous of degree $1.$ Hence, by [Reference Runde20, Theorem 7.1.1], we get that ${\mathcal M}$ is an abelian von Neumann algebra.

3 Column–row property for other operator spaces

We shall now study the completely bounded versions of the notions CRP and CMP. To state our result, we introduce the following definitions.

Definition 3.1 Let E be an operator space. We say E has the CMP if there exists a constant $C>0$ such that, for all $n\in \mathbb N$ and $[x_{ij}]_{i,j=1}^n\in M_n(E),$ we have

$$\begin{align*}\|[x_{ij}]_{i,j=1}^n\|_{M_n(E)}\leq C\| \begin{bmatrix} x_{11} \\ \vdots\\ x_{n1}\\ \vdots\\ x_{nn} \end{bmatrix}\|_{M_n(E)}. \end{align*}$$

Definition 3.2 Let E be an operator space. E is said to satisfy the completely bounded CRP if there exists a constant $C>0$ such that, for all $n\geq 1$ , we have

$$\begin{align*}\|[x_1\dots x_n]^t\mapsto [x_1\dots x_n]\|_{cb, M_{n,1}(E)\to M_{1,n}(E)}<C.\end{align*}$$

We now show that there is no nontrivial operator space with the completely bounded CRP.

Proposition 3.1 Let E be an operator space which is not equal to the zero vector space. Then E does not have the completely bounded CRP.

Proof Let $e\in E$ be such that $\|e\|=1.$ Then it follows from the property of the operator space injective tensor product [Reference Effros and Ruan6, p. 142] that the map $i_n:M_{n,1}\to M_{n,1}\check {\otimes }E$ given by $x\mapsto x\otimes e$ is a complete isometry. Also $t_n(x\otimes e)=t_n(x)\otimes e$ for all $x\in M_{n,1}.$ We have $\|t_n\|_{cb, M_{n,1}\check {\otimes }E\to M_{1,n}\check {\otimes }E}\geq \sup _{N\geq 1,[x_{ij}]_{i,j=1}^N\neq 0}\frac {\|[t_n(x_{ij})]_{i,j=1}^N\|_{M_N(M_{1,n})}}{\|[x_{ij}]_{i,j=1}^N\|_{M_N(M_{n,1})}}=\sqrt {n}.$ The last estimate in the above inequality follows from [Reference Pisier16, p. 22]. This shows that E does not have completely bounded CRP. This completes the proof of the theorem.

We present a characterization of CRP for $C^*$ -algebras. First, we need the following lemma.

Lemma 3.2 Let E be an operator space. Then E has CRP iff $E^{**}$ has CRP.

Proof Note that if $E^{**}$ has CRP, then E has CRP follows from the fact that the natural inclusion of E inside $E^{**}$ is a complete isometry [Reference Effros and Ruan6, Proposition 3.2.1]. To prove the converse, note by the duality between the projective and injective tensor product of operator spaces (see [Reference Pisier16, Theorem 4.1]) and the fact that $M_{n,1}^*=M_{1,n}$ completely isometrically (see [Reference Pisier16, Exercise 2.3.5]), we have $ \|t_n\otimes id_{E^{**}}\|_{M_{n,1}\check {\otimes }E^{**}\to M_{1,n}\check {\otimes }E^{**}}=\|t_n\otimes id_{E}\|_{M_{n,1}\check {\otimes }E\to M_{1,n}\check {\otimes }E}.$ The proof follows by using Lemma 2.1.

Theorem 3.3 Let A be a $C^*$ -algebra. Then A has CRP iff A is subhomogeneous. Moreover, A has CRP with constant $1$ iff A is abelian.

Proof One direction follows from [Reference Roydor18]. Note that if A has CRP, then by Lemma 3.2, $A^{**}$ is a von Neumann algebra which has CRP. However, it is folklore that if $A^{**}$ is not subhomogeneous then it contains $M_n$ for all $n\geq 1.$ We get a contradiction by looking at $A_n$ and $B_n$ defined in Section 2.

Remark 3.4. One can also have the following alternative approach. Recall that the Haagerup tensor product norm on the algebraic tensor product is defined by

$$\begin{align*}\|z\|_h:=\inf\left\{\left\|\sum_{i=1}^n x_ix_i^{*}\left\|^{\frac{1}{2}}\right\|\sum_{i=1}^n y_i^*y_i\right\|^{\frac{1}{2}}:z=\sum_{i=1}^n x_i\otimes y_i\right\} \quad (z \in A\otimes A). \end{align*}$$

Let us consider $\text {inv}:A\otimes A\to A\otimes A$ , defined on the elementary tensors by $\text {inv}(x\otimes y ):=x^*\otimes y^*.$ If A has CRP it follows that for some $C>0$ and for all $z\in A\otimes A$ , $ \|\text {inv}(z)\|\leq C\|z\|. $ The result follows from [Reference Kumar9, Part (iii) Theorem 2.2.]. If $C=1,$ then A is abelian follows from [Reference Kumar9, Theorem 2.3].

Remark 3.5. Operator spaces for which $\|id_E\|_{cb, E\to E^{op}}=1$ , have been studied for $C^*$ -algebras and operator algebras in [Reference Blecher4, Reference Okayusu12].

The following list summarizes the results which establishes CRP and other related properties for some well-known examples of operator spaces. Checking the properties are easy in the most of the cases and some of it maybe present in the literature.

  • $MIN(E), MAX(E)$ , and $L_p(\Omega )$ , for $1\leq p\leq \infty ,$ have CRP with constant $1$ , where $MIN(E)$ and $MAX(E)$ denote the so called minimal and maximal quantization of a Banach space E. For $MIN(E)$ and $MAX(E)$ , this follows from their definitions. By duality and interpolation one sees that the result for $L_p(\Omega )$ follows from complex interpolation. Moreover, $MIN(E)$ has CMP with constant $1.$ This is because $\text {MIN}(E)$ embeds completely isometrically into $C(K)$ for some compact Hausdroff topological space K [Reference Effros and Ruan6, Proposition 3.3.1] and for all $[f_{ij}]_{i,j=1}^n\in M_n(C(K)),$ we have $\sup _{s\in K}\|[f_{ij}(s)]\|_{op}\leq \sup _{s\in K}(\sum _{i,j=1}^n|f_{ij}(s)|^2)^{1/2}.$

  • The operator Hilbert space over the indexing set I, denoted by $OH(I)$ , have CMP with constant $1$ , which further implies that $S_2$ (the class of Hilbert–Schmidt operators on $\ell _2$ ) and, more generally, $L_2({\mathcal M})$ have this property as well with constant $1$ , where ${\mathcal M}$ is a semifinite von Neumann algebra. Note that, by the description of the norm of $OH(I)$ , we have the formula

    $$\begin{align*}\|[x_{ij}]_{i,j=1}^n\|_{M_n(OH(I))}=\|\big [[\langle x_{ij}, x_{kl}\rangle]_{k,l=1}^n \big ]_{i,j=1}^n\|^{\frac{1}{2}}_{M_{n^2}}.\end{align*}$$
    From Lemma 2.3, we get $\|[a_1 \ldots a_n]^t\|_{M_{n,1}(OH(I))}=(\sum _{i,j=1}^n|\langle a_i, a_j\rangle |^2)^{\frac {1}{4}}$ , and thus, we get the trivial inequality
    $$\begin{align*}\|[x_{ij}]_{i,j=1}^n\|_{M_n(OH(I))}\leq \left(\sum_{i,j=1}^n\sum_{k,l=1}^n|\langle x_{ij},x_{kl}\rangle|^2\right)^{\frac{1}{2}}. \end{align*}$$
  • The column Hilbert space C has the CRP with constant $1$ . The row Hilbert space does not have the CRP.

4 Concluding remarks

In the literature, there are several important studies on properties which have a certain resemblance to CRP. An operator space is called symmetric if it is completely isometric to its opposite [Reference Blecher4] via the identity map. Okayusu [Reference Okayusu12] showed that a $C^*$ -algebra is symmetric if and only if it is commutative. Thus Theorem 3.3, can be considered as a generalization of the aforementioned result. Using Okayusu’s characterization, Tomiyama [Reference Tomiyama23] studied the positivity of the transpose map on $C^*$ -algebras. Furthermore, Blecher [Reference Blecher4] extended Okayusu’s result and showed that any unital operator algebra which is symmetric must be commutative. We refer the reader to [Reference Roydor18] for some related results. Our characterizations on $L_p$ -spaces with CRP can be observed as a contribution toward results belonging to the theme of the above direction. Moreover, estimates on the completely bounded norm of the transpose maps on noncommutative $L_p$ -spaces were crucial in the recent work of Le Merdy and Zadeh for studying separating maps on noncommutative $L_p$ -spaces (see [Reference Le Merdy and Zadeh10, Reference Le Merdy and Zadeh11]).

Acknowledgment

The authors are thankful to Michael Hartz for some useful communications throughout the work. They would also like to thank the anonymous referee for reading the manuscript intricately and giving important comments and revisions which have improved the presentation of this article.

Footnotes

The first and second author acknowledges the DST-INSPIRE Faculty Fellowship DST/INSPIRE/04/2020/001132 and DST/INSPIRE/04/2019/000769, respectively.

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