Asymptotic forms for hard and soft edge general $\beta$ conditional gap probabilities
Abstract
An infinite log-gas formalism, due to Dyson, and independently Fogler and Shklovskii, is applied to the computation of conditioned gap probabilities at the hard and soft edges of random matrix -ensembles. The conditioning is that there are eigenvalues in the gap, with , denoting the end point of the gap. It is found that the entropy term in the formalism must be replaced by a term involving the potential drop to obtain results consistent with known asymptotic expansions in the case . With this modification made for general , the derived expansions - which are for the logarithm of the gap probabilities - are conjectured to be correct up to and including terms O. They are shown to satisfy various consistency conditions, including an asymptotic duality formula relating to .
Keywords
Cite
@article{arxiv.1110.4284,
title = {Asymptotic forms for hard and soft edge general $\beta$ conditional gap probabilities},
author = {Peter J. Forrester and Nicholas S. Witte},
journal= {arXiv preprint arXiv:1110.4284},
year = {2015}
}
Comments
Replaces v2 which contains typographical errors arising from a previous unpublished draft