Orthogonal polynomials in weighted Bergman spaces

Abstract

Let w be a weight on the unit disk D having the form \[w(z)=|v(z)|2Πk=1s|z-ak1-zak|mk\,, mk>-2,\ |ak|<1,\] where v is analytic and free of zeros in D, and let (pn)n=0∞ be the sequence of polynomials (pn of degree n) orthonormal over D with respect to w. We give an integral representation for pn from which it is in principle possible to derive its asymptotic behavior as n∞ at every point z of the complex plane, the asymptotic analysis of the integral being primarily dependent on the nature of the first singularities encountered by the function v(z)-1Πk=1s(1-zak)-1.