Classification of 2-Orthogonal Polynomials with Brenke Type Generating Functions

Abstract

The Brenke type generating functions are the polynomial generating functions of the form Σn=0∞Pn(x ) n!tn=A(t)B(xt), where A and B are two formal power series subject to the conditions A(0)\;B(k)(0)≠0,\, k=0,1,2….\\ In this work, we determine all Brenke-type polynomials when they are also 2-orthogonal polynomial sets, that is to say, polynomials satisfying one standard four-term recurrence relation. That allows us, on one hand, to obtain new 2-orthogonal sequences generalizing known orthogonal families of polynomials, and on the other hand, to recover particular cases of polynomial sequences discovered in the context of d-orthogonality.\\ The classification is based on the resolution of a three-order difference equation induced by the four-term recurrence relation satisfied by the considered polynomials. This study is motivated by the work of Chihara who gave all pairs (A (t), B(t)) for which \Pn(x)\n≥ 0 is an orthogonal polynomial sequence.

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