Painlev\'e representation of Tracy-Widomβ distribution for β = 6

Abstract

In arXiv:1306.2117, we found explicit Lax pairs for the soft edge of beta ensembles with even integer values of β. Using this general result, the case β=6 is further considered here. This is the smallest even β, when the corresponding Lax pair and its relation to Painlev\'e II (PII) have not been known before, unlike cases β=2 and 4. It turns out that again everything can be expressed in terms of the Hastings-McLeod solution of PII. In particular, a second order nonlinear ODE for the logarithmic derivative of Tracy-Widom distribution for β=6 involving the PII function in the coefficients, is found, which allows one to compute asymptotics for the distribution function. The ODE is a consequence of a linear system of three ODEs for which the local singularity analysis yields series solutions with exponents in the set 4/3, 1/3 and -2/3.