Recurrence equations involving different orthogonal polynomial sequences and applications

Abstract

Consider \pn\n=0∞, a sequence of polynomials orthogonal with respect to w(x)>0 on (a,b), and polynomials \gn,k\n=0∞,k ∈ N0, orthogonal with respect to ck(x)w(x)>0 on (a,b), where ck(x) is a polynomial of degree k in x. We show how Christoffel's formula can be used to obtain mixed three-term recurrence equations involving the polynomials pn, pn-1 and gn-m,k,m∈\2,3,…, n-1\. In order for the zeros of pn and Gm-1gn-m,k to interlace (assuming pn and gn-m,k are co-prime), the coefficient of pn-1, namely Gm-1, should be of exact degree m-1, in which case restrictions on the parameter k are necessary. The zeros of Gm-1 can be considered to be inner bounds for the extreme zeros of the (classical or q-classical) orthogonal polynomial pn and we give examples to illustrate the accuracy of these bounds. Because of the complexity the mixed three-term recurrence equations in each case, algorithmic tools, mainly Zeilberger's algorithm and its q-analogue, are used to obtain them.

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