Zeros of Quasi-Orthogonal Jacobi Polynomials

Abstract

We consider interlacing properties satisfied by the zeros of Jacobi polynomials in quasi-orthogonal sequences characterised by α>-1, -2<β<-1. We give necessary and sufficient conditions under which a conjecture by Askey, that the zeros of Jacobi polynomials Pn(α, β) and Pn(α,β+2) are interlacing, holds when the parameters α and β are in the range α>-1 and -2<β<-1. We prove that the zeros of Pn(α, β) and Pn+1(α,β) do not interlace for any n∈N, n≥2 and any fixed α, β with α>-1, -2<β<-1. The interlacing of zeros of Pn(α,β) and Pm(α,β+t) for m,n∈N is discussed for α and β in this range, t≥ 1, and new upper and lower bounds are derived for the zero of Pn(α,β) that is less than -1.