The Index Distribution of Gaussian Random Matrices

Abstract

We compute analytically, for large N, the probability distribution of the number of positive eigenvalues (the index N+) of a random NxN matrix belonging to Gaussian orthogonal (β=1), unitary (β=2) or symplectic (β=4) ensembles. The distribution of the fraction of positive eigenvalues c=N+/N scales, for large N, as Prob(c,N)[-β N2 (c)] where the rate function (c), symmetric around c=1/2 and universal (independent of β), is calculated exactly. The distribution has non-Gaussian tails, but even near its peak at c=1/2 it is not strictly Gaussian due to an unusual logarithmic singularity in the rate function.