Spectral distribution of the free Jacobi process, revisited

Abstract

We obtain a description for the spectral distribution of the free Jacobi process for any initial pair of projections. This result relies on a study of the unitary operator RUtSUt* where R,S are two symmetries and Ut a free unitary Brownian motion, freely independent from \R,S\. In particular, for non-null traces of R and S, we prove that the spectral measure of RUtSUt* possesses two atoms at 1 and an L∞-density on the unit circle T, for every t>0. Next, via a Szego type transform of this law, we obtain a full description of the spectral distribution of PUtQUt* beyond the τ(P)=τ(Q)=1/2 case. Finally, we give some specializations for which these measures are explicitly computed.