Module super-amenability for semigroup algebras
Abstract
Let S be an inverse semigroup with the set of idempotents E. In this paper we define the module super-amenability of a Banach algebra which is a Banach module over another Banach algebra with compatible actions, and show that when E is upward directed and acts on S trivially from left and by multiplication from right, the semigroup algebra 1(S) is 1(E)-module super-amenable if and only if an appropriate group homomorphic image of S is finite.
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