Homogenized spectral problems for exactly solvable operators: asymptotics of polynomial eigenfunctions

Abstract

Consider a homogenized spectral pencil of exactly solvable linear differential operators T=Σi=0k Qi(z)k-i didzi, where each Qi(z) is a polynomial of degree at most i and is the spectral parameter. We show that under mild nondegeneracy assumptions for all sufficiently large positive integers n there exist exactly k distinct values n,j, 1 j k, of the spectral parameter such that the operator T has a polynomial eigenfunction pn,j(z) of degree n. These eigenfunctions split into k different families according to the asymptotic behavior of their eigenvalues. We conjecture and prove sequential versions of three fundamental properties: the limits j(z)=n∞ pn,j'(z)n,jpn,j(z) exist, are analytic and satisfy the algebraic equation Σi=0k Qi(z) ji(z)=0 almost everywhere in . As a consequence we obtain a class of algebraic functions possessing a branch near ∞∈ which is representable as the Cauchy transform of a compactly supported probability measure.