Biflatness and Pseudo-Amenability of Segal algebras

Ebrahim Samei; Nico Spronk; Ross Stokke

arXiv:0801.0731·math.FA·August 15, 2019

Biflatness and Pseudo-Amenability of Segal algebras

Ebrahim Samei, Nico Spronk, Ross Stokke

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TL;DR

This paper explores advanced algebraic properties like biflatness and pseudo-amenability in Segal algebras within group and Fourier algebras, enhancing understanding of their structure and behavior.

Contribution

It provides new insights into the generalized amenability and biflatness of operator Segal algebras in L1(G) and A(G), expanding theoretical knowledge.

Findings

01

Characterizes biflatness in Segal algebras

02

Analyzes pseudo-amenability conditions

03

Links properties to group algebra structures

Abstract

We investigate generalized amenability and biflatness properties of various (operator) Segal algebras in both the group algebra, L1(G), and the Fourier algebra, A(G), of a locally compact group, G.

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