Ideals with approximate unit in semicrossed products

Charalampos Magiatis

arXiv:2301.04380·math.OA·January 12, 2023

Ideals with approximate unit in semicrossed products

Charalampos Magiatis

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Open Access

TL;DR

This paper characterizes the ideals of semicrossed products of $C_0(X)$ with $ ext{Z}_+$, focusing on the existence of approximate units on the left or right, providing a detailed structural understanding.

Contribution

It provides a new characterization of ideals with approximate units in semicrossed products, advancing the understanding of their algebraic structure.

Findings

01

Characterization of ideals with approximate units in semicrossed products.

02

Analysis of left and right approximate units in these algebras.

03

Enhanced understanding of the ideal structure in semicrossed products.

Abstract

We characterize the ideals of the semicrossed product $C_{0} (X) \times_{ϕ} Z_{+}$ with left (resp. right) approximate unit.

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Taxonomy

TopicsRings, Modules, and Algebras