The Brown measure of the free multiplicative Brownian motion

Abstract

The free multiplicative Brownian motion bt is the large-N limit of the Brownian motion on GL(N;C), in the sense of -distributions. The natural candidate for the large-N limit of the empirical distribution of eigenvalues is thus the Brown measure of bt. In previous work, the second and third authors showed that this Brown measure is supported in the closure of a region t that appeared work of Biane. In the present paper, we compute the Brown measure completely. It has a continuous density Wt on t, which is strictly positive and real analytic on t. This density has a simple form in polar coordinates: \[ Wt(r,θ)=1r2wt(θ), \] where wt is an analytic function determined by the geometry of the region t. We show also that the spectral measure of free unitary Brownian motion ut is a "shadow" of the Brown measure of bt, precisely mirroring the relationship between Wigner's semicircle law and Ginibre's circular law. We develop several new methods, based on stochastic differential equations and PDE, to prove these results.