On the leading coefficient of polynomials orthogonal over domains with corners

Abstract

Let G be the interior domain of a piecewise analytic Jordan curve without cusps. Let \pn\n=0∞ be the sequence of polynomials that are orthonormal over G with respect to the area measure, with each pn having leading coefficient λn>0. N. Stylianopoulos has recently proven that the asymptotic behavior of λn as n∞ is given by \[ n+1πγ2n+2 λn2=1-αn, \] where αn=O(1/n) as n∞ and γ is the reciprocal of the logarithmic capacity of the boundary ∂ G. In this paper, we prove that the O(1/n) estimate for the error term αn is, in general, best possible, by exhibiting an example for which \[ n∞\,nαn>0. \] The proof makes use of the Faber polynomials, about which a conjecture is formulated.