Asymptotics of polynomials orthogonal over circular multiply connected domains

Abstract

Let D be a domain obtained by removing, out of the unit disk \z:|z|<1\, finitely many mutually disjoint closed disks, and for each integer n≥ 0, let Pn(z)=zn+·s be the monic nth-degree polynomial satisfying the planar orthogonality condition ∫D Pn(z)zmdxdy=0, 0≤ m<n. Under a certain assumption on the domain D, we establish asymptotic expansions and formulae that describe the behavior of Pn(z) as n∞ at every point z of the complex plane. We also give an asymptotic expansion for the squared norm ∫D|Pn|2dxdy.