Zeros of linear combinations of orthogonal polynomials

Abstract

Given a sequence of orthogonal polynomials (pn)n with respect to a positive measure in the real line, we study the real zeros of finite combinations of K+1 consecutive orthogonal polynomials of the form qn(x)=Σj=0Kγjpn-j(x), n K, where γj, j=0,·s ,K, are real numbers with γ0=1, γK =0 (which do not depend on n). We prove that for every positive measure μ there always exists a sequence of orthogonal polynomials with respect to μ such that all the zeros of the polynomial qn above are real and simple for n n0, where n0 is a positive integer depending on K and the γj's.