数学物理学报(英文版) ›› 2024, Vol. 44 ›› Issue (6): 2443-2464.doi: 10.1007/s10473-024-0621-1

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THE STABILITY OF AF-RELATIONS

Jiajie HUA   

  1. College of Data Science, Jiaxing University, Jiaxing 314001, China
  • 收稿日期:2023-06-16 修回日期:2024-07-13 发布日期:2024-12-06
  • 作者简介:Jiajie HUA, E-mail: jiajiehua@zjxu.edu.cn
  • 基金资助:
    Scientific Research Fund of Zhejiang Provincial Education Department (Y202249575), the National Natural Science Foundation of China (11401256) and the Zhejiang Provincial Natural Science Foundation of China (LQ13A010016).

THE STABILITY OF AF-RELATIONS

Jiajie HUA   

  1. College of Data Science, Jiaxing University, Jiaxing 314001, China
  • Received:2023-06-16 Revised:2024-07-13 Published:2024-12-06
  • About author:Jiajie HUA, E-mail: jiajiehua@zjxu.edu.cn
  • Supported by:
    Scientific Research Fund of Zhejiang Provincial Education Department (Y202249575), the National Natural Science Foundation of China (11401256) and the Zhejiang Provincial Natural Science Foundation of China (LQ13A010016).

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

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

中图分类号: 

  • 46L05