The Large-N Limits of Brownian Motions on GLN

Abstract

We introduce a two-parameter family of diffusion processes (Br,sN(t))t 0, r,s>0, on the general linear group GLN that are Brownian motions with respect to certain natural metrics on the group. At the same time, we introduce a two-parameter family of free It\o processes (br,s(t))t 0 in a faithful, tracial W-probability space, and we prove that the full process (BNr,s(t))t 0 converges to (br,s(t))t 0 in noncommutative distribution as N∞ for each r,s>0. The processes (br,s(t))t 0 interpolate between the free unitary Brownian motion when (r,s)=(1,0), and the free multiplicative Brownian motion when r=s=12; we thus resolve the open problem of convergence of the Brownian motion on GLN posed by Biane in 1997.