Brown Measure Support and the Free Multiplicative Brownian Motion

Abstract

The free multiplicative Brownian motion bt is the large-N limit of Brownian motion BtN on the general linear group GL(N;C). We prove that the Brown measure for bt---which is an analog of the empirical eigenvalue distribution for matrices---is supported on the closure of a certain domain t in the plane. The domain t was introduced by Biane in the context of the large-N limit of the Segal--Bargmann transform associated to GL(N;C). We also consider a two-parameter version, bs,t: the large-N limit of a related family of diffusion processes on GL(N;C) introduced by the second author. We show that the Brown measure of bs,t is supported on the closure of a certain planar domain s,t, generalizing t, introduced by Ho. In the process, we introduce a new family of spectral domains related to any operator in a tracial von Neumann algebra: the Lpn-spectrum for n∈N and p 1, a subset of the ordinary spectrum defined relative to potentially-unbounded inverses. We show that, in general, the support of the Brown measure of an operator is contained in its L22-spectrum.