Extension of derivations, and Connes-amenability of the enveloping dual Banach algebra

Abstract

If D:A X is a derivation from a Banach algebra to a contractive, Banach A-bimodule, then one can equip X** with an A**-bimodule structure, such that the second transpose D**: A** X** is again a derivation. We prove an analogous extension result, where A** is replaced by (A), the enveloping dual Banach algebra of A, and X** by an appropriate kind of universal, enveloping, normal dual bimodule of X. Using this, we obtain some new characterizations of Connes-amenability of (A). In particular we show that (A) is Connes-amenable if and only if A admits a so-called WAP-virtual diagonal. We show that when A=L1(G), existence of a WAP-virtual diagonal is equivalent to the existence of a virtual diagonal in the usual sense. Our approach does not involve invariant means for G.