New tools for the study of Bochner differential operators

Abstract

A sequence \δn(k)\ associated to a Bochner differential operator is introduced as an effective tool to study this kind of operators. Some properties of this sequence are proven and used to deduce that a particular operator leads to solutions of a bispectral problem. In addition, the inverse problem is studied; that is, given a sequence \λn\ of complex numbers and a sequence \Pn\ of polynomials with complex coefficients, Pn=n, we find a necessary and sufficient condition for the existence of a Bochner differential operator that has those sequences as eigenvalues and eigenpolynomials, respectively. The mentioned condition also depends on \δn(k)\.

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