Quantum automorphisms of twisted group algebras and free hypergeometric laws

Abstract

We prove that we have an isomorphism of type Aaut( Cσ[G]) Aaut( C[G])σ, for any finite group G, and any 2-cocycle σ on G. In the particular case G= Zn2, this leads to a Haar-measure preserving identification between the subalgebra of Ao(n) generated by the variables uij2, and the subalgebra of As(n2) generated by the variables Xij=Σa,b=1npia,jb. Since uij is "free hyperspherical" and Xij is "free hypergeometric", we obtain in this way a new free probability formula, which at n=∞ corresponds to the well-known relation between the semicircle law, and the free Poisson law.