Restricted Maximum of Non-Intersecting Brownian Bridges

Abstract

Consider a system of N non-intersecting Brownian bridges in [0,1], and let MN(p) be the maximal height attained by the top path in the interval [0,p], p∈[0,1]. It is known that, under a suitable rescaling, the distribution of MN(p) converges, as N∞, to a one-parameter family of distributions interpolating between the Tracy-Widom distributions for the Gaussian Orthogonal and Unitary Ensembles (corresponding, respectively, to p1 and p0). It is also known that, for fixed N, MN(1) is distributed as the top eigenvalue of a random matrix drawn from the Laguerre Orthogonal Ensemble. Here we show a version of these results for MN(p) for fixed N, showing that MN(p)/p converges in distribution, as p0, to the rightmost charge in a generalized Laguerre Unitary Ensemble, which coincides with the top eigenvalue of a random matrix drawn from the Antisymmetric Gaussian Ensemble.