On Bochner-Krall orthogonal polynomial systems
Abstract
In this paper we address the classical question going back to S. Bochner and H.L. Krall to describe all systems pn(x) of orthogonal polynomials (OPS) which are the eigenfunctions of some finite order differential operator, i.e. satisfy the equation Σk=1Nak(x)y(k)(x)=n y(x) (1). Such systems of orthogonal polynomials are called Bochner-Krall OPS (or BKS for short) and their spectral differential operators are accordingly called Bochner-Krall operators (or BK-operators for short). We say that a BKS has compact type if it is orthogonal with respect to a compactly supported positive measure on the real line. It is well-known that the order N of any BK-operator should be even and every coefficient ak(x) must be a polynomial of degree at most k. Below we show that the leading coefficient of a compact type BK-operator is of the form ((x - a)(x-b))N/2. This settles the special case of the general conjecture of describing the leading terms of all BK-operators. New results on the asymptotic distribution of zeros of polynomial eigenfunctions for a spectral problem (1) are the main ingredient in the proofs.
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