Arieh Iserles, Syvert Paul Nørsett
Published 1994-04-22Version 1
Given a parametrised weight function $\omega(x,\mu)$ such that the quotients of its consecutive moments are M\"obius maps, it is possible to express the underlying biorthogonal polynomials in a closed form \cite{IN2}. In the present paper we address ourselves to two related issues. Firstly, we demonstrate that, subject to additional assumptions, every such $\omega$ obeys (in $x$) a linear differential equation whose solution is a generalized hypergeometric function. Secondly, using a generalization of standard divided differences, we present a new explicit representation of the underlying orthogonal polynomials.
Two closed-form evaluations for the generalized hypergeometric function ${}_4F_3(\frac1{16})$
Completely regular growth solutions to linear differential equations with exponential polynomials coefficients
Inequalities and monotonicity of ratios for generalized hypergeometric function
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