Amenable crossed product Banach algebras associated with a class of C-dynamical systems. II
Abstract
We prove that the crossed product Banach algebra 1(G,A;α) that is associated with a C-dynamical system (A,G,α) is amenable if G is a discrete amenable group and A is a strongly amenable C-algebra. This is a consequence of the combination of a more general result with Paterson's characterisation of strongly amenable unital C-algebras in terms of invariant means for their unitary groups.
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