# Inductive Limits for Systems of Toeplitz Algebras

**Authors:** R.N.Gumerov

arXiv: 1904.00292 · 2019-04-02

## TL;DR

This paper investigates inductive systems of Toeplitz algebras over arbitrary directed sets, establishing isomorphisms with reduced semigroup C*-algebras and exploring their structure in various partially ordered contexts.

## Contribution

It introduces a framework for inductive systems of Toeplitz algebras defined by natural numbers and proves their isomorphism with certain reduced semigroup C*-algebras.

## Key findings

- Existence of isomorphism with reduced semigroup C*-algebras
- Analysis of inductive systems over arbitrary directed sets
- Extension to systems over partially ordered sets

## Abstract

This article deals with inductive systems of Toeplitz algebras over arbitrary directed sets. For such a system the family of its connecting injective $*$-homomorphisms is defined by a set of natural numbers satisfying a factorization property. The motivation for the study of those inductive systems comes from our previous work on the inductive sequences of Toeplitz algebras defined by sequences of numbers and the limit automorphisms for the inductive limits of such sequences. We show that there exists an isomorphism in the category of unital $C^*$-algebras and unital $*$-homomorphisms between the inductive limit of an inductive system of Toeplitz algebras over a directed set defined by a set of natural numbers and a reduced semigroup $C^*$-algebra for a semigroup in the group of all rational numbers. The inductive systems of Toeplitz algebras over arbitrary partially ordered sets defined by sets of natural numbers are also studied.

## Full text

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## References

32 references — full list in the complete paper: https://tomesphere.com/paper/1904.00292/full.md

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Source: https://tomesphere.com/paper/1904.00292