THE STABILITY OF AF-RELATIONS

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doi:10.1007/s10473-024-0621-1

摘要： For given $\ell,s\in \mathbb{N},$ $\Lambda=\{\rho_j\}_{j=1,\cdots,s},\rho_j\in\mathbb{T}$ , the $C^*$ -algebra $\mathcal{B}:=\mathcal{E}(\{r_j\}_{j=1,\cdots,s},\Lambda,\\ \ell)$ is defined to be the universal $C^*$ -algebra generated by $\ell$ unitaries $\mathfrak{u}_1,\cdots,\mathfrak{u}_{\ell}$ subject to the relations $r_{j}(\mathfrak{u}_1,\cdots,\mathfrak{u}_{\ell})-\rho_j=0$ for all $j=1,\cdots,s,$ where the $r_j$ is monomial in $\mathfrak{u}_1,\cdots,\mathfrak{u}_{\ell}$ and their inverses for $j=1,2,\cdots,s$ . If $\mathcal{B}$ is a unital $AF$ -algebra with a unique tracial state, and $K_0(\mathcal{B})$ is a finitely generated group, we say that the relations $(\{r_j\}_{j=1,\cdots,s},\Lambda,\ell)$ are $AF$ -relations. If the relations $(\{r_j\}_{j=1,\cdots,s},\Lambda,\ell)$ are $AF$ -relations, we prove that, for any $\varepsilon>0,$ there exists a $\delta>0$ satisfying the following: for any unital $C^*$ -algebra $\mathcal{A}$ with the cancellation property, strict comparison, nonempty tracial state space, and any $\ell$ unitaries $u_1,u_2,\cdots,u_\ell\in\mathcal{A}$ satisfying

$\|r_j(u_1,u_2,\cdots,u_\ell)-\rho_j\|<\delta,\,\,j=1,2,\cdots,s,$ and certain trace conditions, there exist

$\ell$ unitaries

$\tilde{u}_1,\tilde{u}_2,\cdots,\tilde{u}_{\ell}\in\mathcal{A}$ such that

$r_j(\tilde{u}_1,\tilde{u}_2,\cdots,\tilde{u}_\ell)=\rho_j\,\,{\rm for}\,\,j=1,2,\cdots,s, \,\,{\rm and}\,\,\|u_i-\tilde{u}_i\|<\varepsilon\,\,{\rm for}\,\,i=1,2,\cdots,\ell.$ Finally, we give several applications of the above result.

关键词: $C^*$ -algebras, stability, $AF$ -relations, unitary

Abstract: For given $\ell,s\in \mathbb{N},$ $\Lambda=\{\rho_j\}_{j=1,\cdots,s},\rho_j\in\mathbb{T}$ , the $C^*$ -algebra $\mathcal{B}:=\mathcal{E}(\{r_j\}_{j=1,\cdots,s},\Lambda,\\ \ell)$ is defined to be the universal $C^*$ -algebra generated by $\ell$ unitaries $\mathfrak{u}_1,\cdots,\mathfrak{u}_{\ell}$ subject to the relations $r_{j}(\mathfrak{u}_1,\cdots,\mathfrak{u}_{\ell})-\rho_j=0$ for all $j=1,\cdots,s,$ where the $r_j$ is monomial in $\mathfrak{u}_1,\cdots,\mathfrak{u}_{\ell}$ and their inverses for $j=1,2,\cdots,s$ . If $\mathcal{B}$ is a unital $AF$ -algebra with a unique tracial state, and $K_0(\mathcal{B})$ is a finitely generated group, we say that the relations $(\{r_j\}_{j=1,\cdots,s},\Lambda,\ell)$ are $AF$ -relations. If the relations $(\{r_j\}_{j=1,\cdots,s},\Lambda,\ell)$ are $AF$ -relations, we prove that, for any $\varepsilon>0,$ there exists a $\delta>0$ satisfying the following: for any unital $C^*$ -algebra $\mathcal{A}$ with the cancellation property, strict comparison, nonempty tracial state space, and any $\ell$ unitaries $u_1,u_2,\cdots,u_\ell\in\mathcal{A}$ satisfying

$\|r_j(u_1,u_2,\cdots,u_\ell)-\rho_j\|<\delta,\,\,j=1,2,\cdots,s,$ and certain trace conditions, there exist

$\ell$ unitaries

$\tilde{u}_1,\tilde{u}_2,\cdots,\tilde{u}_{\ell}\in\mathcal{A}$ such that

Key words: $C^*$ -algebras, stability, $AF$ -relations, unitary

中图分类号:

46L05

Jiajie HUA. THE STABILITY OF AF-RELATIONS[J]. 数学物理学报(英文版), 2024, 44(6): 2443-2464.

Jiajie HUA. THE STABILITY OF AF-RELATIONS[J]. Acta mathematica scientia,Series B, 2024, 44(6): 2443-2464.

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