Painlev\'e IV, bi-confluent Heun equations and the Hankel determinant generated by a discontinuous semi-classical Laguerre weight

Abstract

We consider the discontinuous semi-classical Laguerre weight function with a jump w(x;t,s)=e-x2+tx(A+Bθ(x-s)), where x∈R, t,s0, A0, A+B0, where θ(x) is 1 for x > 0 and 0 otherwise. Based on the ladder operator approach, we obtain some important difference and differential equations about the auxiliary quantities and the recurrence coefficients. By proper tranformation, It is shown that Rn(t,s) is related to Painlev\'e IV equations and rn(t,s) satisfies the Chazy II equations. With the aid of Dyson's Coulomb fluid approach, we derive the asymptotic expansions for αn and βn as n→∞. Furthermore, This enables us to obtain the lagre n behavior of the orthogonal polynomials and derive that they satisfy the biconfluent Heun equation. We also consider the Hankel determinant Dn(t,s) generated by the discountinuous semi-classical Laguerre weight. We find that the quantity σn(t,s), allied to the logarithmic derivative of Dn(t,s), satisfies the Jimbo-Miwa-Okamoto σ-form of Painlev\'e IV.