NewEvery arXiv paper, its researchers & institutions — mapped.
paper

Higher order large gap asymptotics at the hard edge for Muttalib--Borodin ensembles

arXiv:1906.12130

Abstract

We consider the limiting process that arises at the hard edge of Muttalib--Borodin ensembles. This point process depends on $θ> 0$ and has a kernel built out of Wright's generalized Bessel functions. In a recent paper, Claeys, Girotti and Stivigny have established first and second order asymptotics for large gap probabilities in these ensembles. These asymptotics take the form \begin{equation*} \mathbb{P}(\mbox{gap on } [0,s]) = C \exp \left( -a s^{2ρ} + b s^ρ + c \ln s \right) (1 + o(1)) \qquad \mbox{as }s \to + \infty, \end{equation*} where the constants $ρ$, $a$, and $b$ have been derived explicitly via a differential identity in $s$ and the analysis of a Riemann--Hilbert problem. Their method can be used to evaluate $c$ (with more efforts), but does not allow for the evaluation of $C$. In this work, we obtain expressions for the constants $c$ and $C$ by employing a differential identity in $θ$. When $θ$ is rational, we find that $C$ can be expressed in terms of Barnes' $G$-function. We also show that the asymptotic formula can be extended to all orders in $s$.

73 pages, 8 figures