Three-Parametric Marcenko-Pastur Density

Abstract

The complex Wishart ensemble is the statistical ensemble of M × N complex random matrices with M ≥ N such that the real and imaginary parts of each element are given by independent standard normal variables. The Marcenko--Pastur (MP) density (x; r), x ≥ 0 describes the distribution for squares of the singular values of the random matrices in this ensemble in the scaling limit N ∞, M ∞ with a fixed rectangularity r=N/M ∈ (0, 1]. The dynamical extension of the squared-singular-value distribution is realized by the noncolliding squared Bessel process, and its hydrodynamic limit provides the two-parametric MP density (x; r, t) with time t ≥ 0, whose initial distribution is δ(x). Recently, Blaizot, Nowak, and Warchol studied the time-dependent complex Wishart ensemble with an external source and introduced the three-parametric MP density (x; r, t, a) by analyzing the hydrodynamic limit of the process starting from δ(x-a), a > 0. In the present paper, we give useful expressions for (x; r, t, a) and perform a systematic study of dynamic critical phenomena observed at the critical time t c(a)=a when r=1. The universal behavior in the long-term limit t ∞ is also reported. It is expected that the present system having the three-parametric MP density provides a mean-field model for QCD showing spontaneous chiral symmetry breaking.