English

Painlev\'e V and a Pollaczek-Jacobi type orthogonal polynomials

Classical Analysis and ODEs 2010-08-03 v2

Abstract

We study a sequence of polynomials orthogonal with respect to a one parameter family of weights w(x):=w(x,t)=\rext/xx\al(1x)\bt,t0, w(x):=w(x,t)=\rex^{-t/x}\:x^{\al}(1-x)^{\bt},\quad t\geq 0, defined for x[0,1].x\in[0,1]. If t=0,t=0, this reduces to a shifted Jacobi weight. Our ladder operator formalism and the associated compatibility conditions give an easy determination of the recurrence coefficients. For t>0,t>0, the factor \rext/x\rex^{-t/x} induces an infinitely strong zero at x=0.x=0. With the aid of the compatibility conditions, the recurrence coefficients are expressed in terms of a set of auxiliary quantities that satisfy a system of difference equations. These, when suitably combined with a pair of Toda-like equations derived from the orthogonality principle, show that the auxiliary quantities are a particular Painlev\'e V and/or allied functions. It is also shown that the logarithmic derivative of the Hankel determinant, Dn(t):=det(01xi+j\rext/xx\al(1x)\btdx)i,j=0n1, D_n(t):=\det(\int_{0}^{1} x^{i+j} \:\rex^{-t/x}\:x^{\al}(1-x)^{\bt}dx)_{i,j=0}^{n-1}, satisfies the Jimbo-Miwa-Okamoto σ\sigma-form of the Painlev\'e V and that the same quantity satisfies a second order non-linear difference equation which we believe to be new.

Keywords

Cite

@article{arxiv.0809.3641,
  title  = {Painlev\'e V and a Pollaczek-Jacobi type orthogonal polynomials},
  author = {Yang Chen and Dan Dai},
  journal= {arXiv preprint arXiv:0809.3641},
  year   = {2010}
}

Comments

23 pages, typos corrected, references added

R2 v1 2026-06-21T11:22:40.863Z