Hyperreflexivity constants of the bounded n-cocycle spaces of group algebras and C*-algebras

Abstract

We introduced the concept of strong property (B) with a constant for Banach algebras and, by applying certain analysis on the Fourier algebra of a unit circle, we show that all C*-algebras and group algebras have the strong property (B) with a constant given by 288π(1+2). We then use this result to find a concrete upper bound for the hyperreflexivity constant of Cn(A,X), the space of bounded n-cocycles from A into X, where A is a C*-algebra or the group algebra of a group with an open subgroup of polynomial growth and X is a Banach A-bimodule for which Hn+1(A,X) is a Banach space. As another application, we show that for a locally compact amenable group G and 1<p<∞, the space CVP(G) of convolution operators on Lp(G) are hyperreflexive with a constant given by 288π(1+2). This is the generalization of a well-known result of E. Christiensen for p=2.