Critical edge behavior in the perturbed Laguerre ensemble and the Painleve V transcendent

Abstract: In this paper, we consider the perturbed Laguerre unitary ensemble described by the weight function of $$w(x,t)=(x+t)^{\lambda}x^{\alpha}e^{-x}$$ with $ x\geq 0,\ t>0,\ \alpha>0,\ \alpha+\lambda+1 > 0.$ The Deift-Zhou nonlinear steepest descent approach is used to analyze the limit of the eigenvalue correlation kernel. It was found that under the double scaling $s=4nt,$ $n\to \infty,$ $t\to 0 $ such that $s$ is positive and finite, at the hard edge, the limiting kernel can be described by the $\varphi$-function related to a third-order nonlinear differential equation, which is equivalent to a particular Painlev\'e V (shorted as P${\rm V}$) transcendent via a simple transformation. Moreover, this P${\rm V}$ transcendent is equivalent to a general Painlev\'e P${\rm III}$ transcendent. For large $s,$ the P${\rm V}$ kernel reduces to the Bessel kernel $\mathbf{J}{\alpha+\lambda}.$ For small $s,$ the P${\rm V}$ kernel reduces to another Bessel kernel $\mathbf{J}_\alpha.$ At the soft edge, the limiting kernel is the Airy kernel as the classical Laguerre weight.