Proof of Theorem A

First, note that we use the assumption “the weak Glimm property” only to prove the implication $(4) \Rightarrow (5)$ below, and the assumption “the absolute value of every nonzero, square-zero, element is properly infinite” only to prove the implication $(5) \Rightarrow (6)$ below.

$(1) \Rightarrow (2)$ : Let Q be a quotient of A, and let $0\neq H\leq _h Q$ . Since local pure infiniteness passes to hereditary $\mathrm{C}^{*}$ -subalgebras and quotients (see [Reference Blanchard and Kirchberg2, Proposition 4.1(iii)]), H is locally purely infinite. In particular, H contains a nonzero, stable, $\mathrm{C}^{*}$ -subalgebra D, as desired. (D may be chosen to be nonzero in any specified primitive quotient of H.)

$(2) \Rightarrow (3)$ : Suppose that A is not nowhere scattered. Then [Reference Thiel and Vilalta16, Theorem 3.1( $(1)\iff (6)$ )] implies that A has a GCR irreducible representation, say $\pi : A \to \mathcal {B}(\mathcal {H})$ . Thus, $\mathcal {K}(\mathcal {H}) \cap \pi (A) \neq \{0\}$ , and in fact $\mathcal {K}(\mathcal {H}) \subseteq \pi (A)$ , so

$$ \begin{align*}\mathcal{K}(\mathcal{H}) \cong \pi^{-1}(\mathcal{K}(\mathcal{H}))/{\mathrm{ker}}(\pi) \unlhd A/ {\mathrm{ker}}(\pi).\end{align*} $$

Since by hypothesis A has residual (HS $_{\text {t}}$ ), and (by Remark 2.1) residual (HS $_{\text {t}}$ ) passes to ideals and quotients, $\mathcal {K}(\mathcal {H})$ has property (HS $_{\text {t}}$ ). By [Reference Blanchard and Kirchberg2, Proposition 3.1], a simple $\mathrm{C}^{*}$ -algebra such that every nonzero hereditary $\mathrm{C}^{*}$ -subalgebra contains a nonzero, stable, $\mathrm{C}^{*}$ -subalgebra must be purely infinite. This is a contradiction since $\mathcal {K}(\mathcal {H})$ is simple and elementary, and so is of type I [Reference Blackadar1, Corollary IV.1.2.6], and no $\mathrm{C}^{*}$ -algebra of type I is purely infinite (see [Reference Kirchberg and Rørdam6, Proposition 4.4]).

$(3) \Rightarrow (4)$ : Let Q be a quotient of A, and let $0\neq H\leq _h Q$ . Note that the property of being nowhere scattered passes to hereditary $\mathrm{C}^{*}$ -subalgebras and quotients (by [Reference Thiel and Vilalta16, Proposition 4.1]). Since H is nowhere scattered, it is not of type I (see [Reference Thiel and Vilalta16, Theorem 3.1( $(1)\iff (3)$ )]), and so is noncommutative [Reference Blackadar1, Section IV.1.1.4]. But every noncommutative $\mathrm{C}^{*}$ -algebra has a nonzero, square-zero, element (Proposition II.6.4.14 of [Reference Blackadar1]). This shows that A has residual (HS $_0$ ).

$(4) \Rightarrow (5)$ : Suppose that A has residual (HS $_0$ ), $0\neq a\in A^+$ , and $\varepsilon> 0$ . Then $\overline {aAa}$ has a nonzero, square-zero, element. By the weak Glimm property, there is $r \in \overline {aAa}$ with $r^2=0$ and $(a-\varepsilon )_+\in \overline {ArA}$ . Thus A has the global Glimm property.

$(5) \Rightarrow (6)$ : Let $0\neq a \in A^+$ and $\varepsilon>0$ . Since A has the global Glimm property, there is $r \in S_0(\overline {aAa})$ with $(a-\varepsilon )_+ \in \overline {ArA}$ . Since $|r|\sim _{cu} rr^* \sim _{cu} r^*r,$ the orthogonal elements $x_1:= rr^*$ and $x_2:= r^*r$ are properly infinite, because, by hypothesis, $|r|$ is properly infinite. On the other hand, we have that

$$ \begin{align*}(a-\varepsilon)_+ \in \overline{Ax_1A}=\overline{Ax_2A},\end{align*} $$

and hence, $ (a-\varepsilon )_+ \precsim x_1$ and $(a-\varepsilon )_+ \precsim x_2,$ by [Reference Kirchberg and Rørdam6, Proposition 3.5(ii)]. Now, [Reference Kirchberg and Rørdam6, Proposition 3.3( $\mathrm{(i)}\iff \mathrm{(iii)}$ )] implies that a is properly infinite. This shows that A is purely infinite (see [Reference Kirchberg and Rørdam6, Lemma 4.2]).

$(6) \Rightarrow (1)$ , and $ (6) \Rightarrow (7)$ : These implications are known (see [Reference Blanchard and Kirchberg2, p. 465] and [Reference Kirchberg and Rørdam7, Definition 4.1]).

$(7) \Rightarrow (8)$ : Let A be a weakly purely infinite $\mathrm{C}^{*}$ -algebra, Q be a quotient of A, and $H\leq _h Q$ . Then H is weakly purely infinite, and hence pi-n for some $n\in \Bbb N$ , because being weakly purely infinite passes to hereditary $\mathrm{C}^{*}$ -subalgebras and quotients (see [Reference Kirchberg and Rørdam7, Definition 4.3 and Proposition 4.5(ii) and (iii)]). Since H has no nonzero finite-dimensional representation, Glimm’s lemma [Reference Kirchberg and Rørdam6, Proposition 4.10] implies the existence of nonzero, pairwise orthogonal, pairwise equivalent, positive, elements $t_1, t_2, \dots , t_n$ in H. By [Reference Kirchberg and Rørdam6, Lemmas 2.8 and 2.9],

$$ \begin{align*}t_1 \otimes 1_n \sim t_1 \oplus t_2 \oplus \cdots \oplus t_n\sim \sum_{i=1}^{n} t_i.\end{align*} $$

Since H is pi-n, the element $ t_1 \otimes 1_n$ is properly infinite in $\mathbb M_n(H)$ . But for $x:= \sum _{i=1}^{n} t_i\in H,\ x \sim t_1 \otimes 1_n.$ Thus x is properly infinite in H.

$(8) \Rightarrow (3)$ : Assume that A is not nowhere scattered. Then A has a nonzero elementary ideal-quotient, say L (see [Reference Thiel and Vilalta16, Theorem 3.1( $(1)\iff (5)$ )]). In particular, L is a simple $\mathrm{C}^{*}$ -algebra [Reference Blackadar1, Definition IV.1.2.1]. Since residual (HI) passes to ideals and quotients (by Remark 2.1), the $\mathrm{C}^{*}$ -algebra L has residual (HI). Let $0\neq a \in L^+$ and $L_a:=\overline {aLa}$ . Since L has residual (HI), there is a properly infinite element x in $L_a$ . But, we have that $x \precsim a$ and $a \in L_a = \overline {L_axL_a}.$ Therefore, by [Reference Kirchberg and Rørdam6, Lemma 3.8], a is properly infinite in $L_a$ , and so in L. Hence L is purely infinite (by [Reference Kirchberg and Rørdam6, Lemma 4.2]), which is a contradiction, as L is of type I (see [Reference Kirchberg and Rørdam6, Proposition 4.4]).

Proof of Corollary B

Note first that, by [Reference Blanchard and Kirchberg2, Remark 2.9(iv)] and [Reference Thiel and Vilalta15, Remark 3.2], any purely infinite $\mathrm{C}^{*}$ -algebra has the global (and so the weak) Glimm property. Thus the implication $(1) \Rightarrow (2)$ is true. The converse holds, by the proof of the implication $(5) \Rightarrow (6)$ of Theorem A (where the weak Glimm property is not necessary). Thus $(1)$ and $(2)$ are equivalent. Moreover, (locally) purely infinite $\mathrm{C}^{*}$ -algebras have residual (HS $_t$ ), by Remark 3.1, and residual (HI), by [Reference Kirchberg and Rørdam6, Theorem 4.16]. Thus the implications $(1) \Rightarrow (3)$ and $(1) \Rightarrow (4)$ hold. The converse implications hold by Theorem A.

Proof of Corollary C

Suppose that A is weakly purely infinite, $0\neq a\in A^+$ , and $\varepsilon>0$ . Then A is locally purely infinite (see [Reference Blanchard and Kirchberg2, Proposition 4.11]), and hence A has residual (HS $_0$ ), by Remark 3.1. Thus $\overline {aAa}$ has a nonzero, square-zero, element. But A has the weak Glimm property, and so there exists an element $r \in \overline {aAa}$ with $r^2 = 0$ such that $(a - \varepsilon )_+ \in \overline {ArA}$ . This shows that A has the global Glimm property. Now, by [Reference Kirchberg and Rørdam7, Proposition 4.15], A

Proof of Corollary D

To prove, use [Reference Enders and Shulman4, Corollary 5] and [Reference Thiel and Vilalta16, Theorem 3.1( $(1)\iff (2)$ )].

Proof of Corollary E

It is known that a $\mathrm{C}^{*}$ -algebra with the global Glimm property is nowhere scattered [Reference Thiel and Vilalta15, Theorem 7.1], and so is strictly antiliminary (use [Reference Thiel and Vilalta16, Theorem 3.1( $(1)\iff (2)$ )] – or Corollary D). This proves $ (1) \Rightarrow (2)$ and $ (1) \Rightarrow (3)$ . For the converse implications, suppose that A has the weak Glimm property and is nowhere scattered (resp., antiliminary), and consider $a\in A^+$ and $\varepsilon>0$ . By Corollary D, A has residual (HS $_0$ ) (resp., property (HS $_0$ )). Thus $\{0\} \neq S_0(\overline {aAa})$ , and hence, by the weak Glimm property, there is $r \in \overline {aAa}$ such that $r^2=0$ and $(a-\varepsilon )_+\in \overline {ArA}$ . This shows that A has the global Glimm property.

Proof of Proposition F

$(1) \Rightarrow (2)$ : Suppose that A has the global Glimm property and H is a hereditary $\mathrm{C}^{*}$ -subalgebra of A. Then H is a Noetherian $\mathrm{C}^{*}$ -algebra with the global Glimm property (see [Reference Thiel and Vilalta15, Theorem 3.10]). Since H is Noetherian, $\mathrm {Prim}(H)$ is compact, and so H has a strictly full element h (see [Reference Pasnicu and Rouzbehani10, Lemma 2.1]). Thus, there exists $\varepsilon>0$ such that $(h-\varepsilon )_+$ is full in H. Since H has the global Glimm property, there is $r \in S_0(\overline {hHh})$ such that $(h-\varepsilon )_+\in \overline {HrH}$ . Hence $H=\overline {H(h-\varepsilon )_+H}\subseteq \overline {HrH},$ and so $H=\overline {HrH}$ . Thus, $(1)$ implies $(2)$ .

$(2) \Rightarrow (1)$ : This is clear, since if $a\in A^+$ , $\varepsilon>0$ , and $A_a:=\overline {aAa}$ , then $A_a$ has a square-zero element r with $A_a=\overline {A_arA_a}$ . Thus,

$$ \begin{align*}(a-\varepsilon)_+ \in A_a \subseteq \overline{ArA},\end{align*} $$

and so A has the global Glimm property.

Proof of Corollary G

By Corollary D, we only need to show $ (1) \Rightarrow (2)$ . Note that a Noetherian and Artinian $\mathrm{C}^{*}$ -algebra A has a composition series of ideals as $0 =I_0 \unlhd I_1\unlhd I_2 \unlhd \cdots \unlhd I_n=A$ such that $I_j/I_{j-1}$ is simple for each $1\leq j \leq n$ . Since residual (HS $_0$ ) passes to ideals and quotients (see Remark 2.1), and the global Glimm property is preserved under extensions [Reference Thiel and Vilalta15, Theorem 3.10], it suffices to show that the implication holds for simple $\mathrm{C}^{*}$ -algebras. But this is obvious, since if A is simple with residual (HS $_0$ ), $a\in A^+$ , and $\varepsilon>0$ , then there is $r \in S_0(\overline {aAa})$ such that $(a-\varepsilon )_+\in \overline {ArA}=A$ .