Affiliation:
1. School of Mathematics and Computer Science, Damghan University, Damghan, Iran
Abstract
Let A be a Banach algebra, A and B be Banach A-module with compatible actions
and X be a Banach left A-A-module and Banach right B-A-module. Then the
corresponding triangular Banach algebra Tri(A,X, B) is a Banach A-module
with compatible actions. In this paper, we study n-weak module amenability
of module extension Banach algebras to provide necessary and sufficient
conditions for n-weak module amenability (as an A-module) of Tri(A,X, B),
when A and B are not necessarily unital and not have bounded approximate
identity. This not only fixes the gaps in some known results in the
literature but also extends that results and gives a direct proof for them.
Furthermore, we characterize n-weak module amenability of triangular matrix
algebras related to inverse semigroups and some triangular Banach algebra
related to locally compact groups.
Publisher
National Library of Serbia
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