Completing the picture for the smallest eigenvalue of real Wishart matrices

Abstract

Rectangular real N × (N + ) matrices W with a Gaussian distribution appear very frequently in data analysis, condensed matter physics and quantum field theory. A central question concerns the correlations encoded in the spectral statistics of WWT. The extreme eigenvalues of W WT are of particular interest. We explicitly compute the distribution and the gap probability of the smallest non-zero eigenvalue in this ensemble, both for arbitrary fixed N and , and in the universal large N limit with fixed. We uncover an integrable Pfaffian structure valid for all even values of ≥ 0. This extends previous results for odd at infinite N and recursive results for finite N and for all . Our mathematical results include the computation of expectation values of half integer powers of characteristic polynomials.