Spectral properties of the Cauchy transform on modified Bergman spaces
Abstract
In this paper, we determine the singular values sn(Tα,β) and sn(Rα,β) of the operators Tα,β= C Pα,β and Rα,β= Pα,β C Pα,β where C is the integral Cauchy transform and Pα,β is the orthogonal projection from L2( D,μα,β) onto the modified Bergman space A2( D,μα,β). These singular values will be expressed in terms of some series involving hypergeometric functions. We show that in both cases the sequence nα+1sn(.) has a finite limit as n+∞.
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