On higher Heine-Stieltjes polynomials

Abstract

Given a differential operator T=Σi=1k Qi(z)di/dzi where each Qi(z) is a polynomial define r=maxi deg(Qi(z)-i). Assuming that r is nonnegative we consider the following multiparameter spectral problem: for each positive integer n find all polynomials V(z) of degree at most r such that the equation T(S(z))+V(z)S(z)=0 has a polynomial solution S(z) of degree n. We calculate for any converging sequence of normalized polynomials Vj(z) the root-counting measure of the corresponding sequence of polynomials Sj(z).