On zeros of quasi-orthogonal Meixner polynomials

Abstract

For each fixed value of β in the range -2<β<-1 and 0<c<1, we investigate interlacing properties of the zeros of polynomials of consecutive degree for Mn(x;β,c) and Mk(x,β+t,c), k∈\n-1,n,n+1\ and t∈\0,1,2\. We prove the conjecture in [K. Driver and A. Jooste, Quasi-orthogonal Meixner polynomials, Quaest. Math. 40 (4) (2017), 477-490] on a lower bound for the first positive zero of the quasi-orthogonal order 1 polynomial Mn(x;β+1,c) and identify upper and lower bounds for the first few zeros of quasi-orthogonal order 2 Meixner polynomials Mn(x;β,c). We show that a sequence of Meixner polynomials \Mn(x;β,c)\n=3∞ with -2<β<-1 and 0<c<1 cannot be orthogonal with respect to any positive measure by proving that the zeros of Mn-1(x;β,c) and Mn(x;β,c) do not interlace for any n∈N≥q 3.