Central extensions and almost representations
Abstract
For a sequence of unital tracial C*-algebras (An,τn), we construct a canonical central extension of the unitary group U(∞ (N,An)/c0(N,An)) by Q(R)=c0(N,R)/R∞, using de la Harpe-Skandalis pre-determinant. For an asymptotic group homomorphism n : U(An), the corresponding pullback of the canonical central extension gives a 2-cohomology class in H2(,Q(R)) which obstructs the perturbation of (n) to a sequence of true homomorphisms of groups πn: GL(An). The pairing of the obstruction class with elements of H2(,Z) yields numerical invariants in τn\,* (K0(An)) that subsume the winding number invariants of Kazhdan, Exel and Loring. For generality, we allow bounded asymptotic homomorphisms to map the group into the general linear group of any sequence of tracial unital Banach algebras. In that case, the obstruction class belongs to H2(,Q(C)), where Q(C)=c0(N,C)/C∞. As an application, we show that 2-cohomology obstructs various stability properties under weaker assumptions than those found in existing literature. In particular we show that the full group C*-algebra C*() of a discrete group is not C*-stable if H2(,R)≠ 0.
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