On the generalized hypergeometric function, Sobolev orthogonal polynomials and biorthogonal rational functions

Abstract

It turned out that the partial sums gn(z) = Σk=0n (a1)k ... (ap)k(b1)k ... (bq)k zkk!, of the generalized hypergeometric series p Fq(a1,...,ap; b1,...,bq;z), with parameters aj,bl∈C\ 0,-1,-2,... \, are Sobolev orthogonal polynomials. The corresponding monic polynomials Gn(z) are polynomials of RI type, and therefore they are related to biorthogonal rational functions. Polynomials gn possess a differential equation (in z), and a recurrence relation (in n). We study integral representations for gn, and some other their basic properties. Partial sums of arbitrary power series with non-zero coefficients are shown to be also related to biorthogonal rational functions. We obtain a relation of polynomials gn(z) to Jacobi-type pencils and their associated polynomials.

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