Central extensions and almost representations

For a sequence of unital tracial $C^*$-algebras $(A_n,\tau_n),$ we construct a canonical central extension of the unitary group $U(\ell^\infty (\mathbb{N},A_n)/c_0(\mathbb{N},A_n))$ by $Q(\mathbb{R})=c_0(\mathbb{N},\mathbb{R})/\mathbb{R}^\infty,$ using de la Harpe-Skandalis pre-determinant. For an asymptotic group homomorphism $\rho_n : \Gamma \to U(A_n),$ the corresponding pullback of the canonical central extension gives a 2-cohomology class in $H^2(\Gamma,Q(\mathbb{R}))$ which obstructs the perturbation of $(\rho_n)$ to a sequence of true homomorphisms of groups $\pi_n:\Gamma \to GL(A_n)$. The pairing of the obstruction class with elements of $H_2(\Gamma,\mathbb{Z})$ yields numerical invariants in $\tau_{n\,*} (K_0(A_n))$ that subsume the winding number invariants of Kazhdan, Exel and Loring. For generality, we allow bounded asymptotic homomorphisms to map the group $\Gamma$ into the general linear group of any sequence of tracial unital Banach algebras. In that case, the obstruction class belongs to $H^2(\Gamma,Q(\mathbb{C})),$ where $Q(\mathbb{C})=c_0(\mathbb{N},\mathbb{C})/\mathbb{C}^\infty.$ 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 $C^*(\Gamma)$ of a discrete group $\Gamma$ is not $C^*$-stable if $H^2(\Gamma,\mathbb{R})\neq 0$.