The higher-dimensional amenability of tensor products of Banach algebras

Abstract

We investigate the higher-dimensional amenability of tensor products of Banach algebras and . We prove that the weak bidimension dbw of the tensor product of Banach algebras and with bounded approximate identities satisfies \[ dbw = dbw + dbw . \] We show that it cannot be extended to arbitrary Banach algebras. For example, for a biflat Banach algebra which has a left or right, but not two-sided, bounded approximate identity, we have dbw 1 and dbw + dbw =2. We describe explicitly the continuous Hochschild cohomology n( , (X Y)*) and the cyclic cohomology n( ) of certain tensor products of Banach algebras and with bounded approximate identities; here (X Y)* is the dual bimodule of the tensor product of essential Banach bimodules X and Y over and respectively.