Laguerre Unitary Ensembles with Jump Discontinuities, PDEs and the Coupled Painlev\'e V System

Abstract

We study the Hankel determinant generated by the Laguerre weight with jump discontinuities at tk, k=1,·s,m. By employing the ladder operator approach to establish Riccati equations, we show that σn(t1,·s,tm), the logarithmic derivative of the n-dimensional Hankel determinant, satisfies a generalization of the σ-from of Painlev\'e V equation. Through investigating the Riemann-Hilbert problem for the associated orthogonal polynomials and via Lax pair, we express σn in terms of solutions of a coupled Painlev\'e V system. We also build relations between the auxiliary quantities introduced in the above two methods, which provides connections between the Riccati equations and Lax pair. In addition, when each tk tends to the hard edge of the spectrum and n goes to ∞, the scaled σn is shown to satisfy a generalized Painlev\'e III equation.