Zeros of large degree Vorob'ev-Yablonski polynomials via a Hankel determinant identity

Abstract

In the present paper we derive a new Hankel determinant representation for the square of the Vorob'ev-Yablonski polynomial Qn(x),x∈C. These polynomials are the major ingredients in the construction of rational solutions to the second Painlev\'e equation uxx=xu+2u3+α. As an application of the new identity, we study the zero distribution of Qn(x) as n→∞ by asymptotically analyzing a certain collection of (pseudo) orthogonal polynomials connected to the aforementioned Hankel determinant. Our approach reproduces recently obtained results in the same context by Buckingham and Miller BM, which used the Jimbo-Miwa Lax representation of PII equation and the asymptotical analysis thereof.