Abstract
In this paper we investigate the asymptotic behaviour of singular numbers of the operator PhCPh, where C is Cauchy's operator and Ph is the orthogonal projection from L2(D) onto harmonic function subspace. We prove that sn(PhCPh)=O(1n), as n→+∞. Moreover, we find the upper and lower asymptotic estimates, π−1⩽limn→+∞nsn(PhCPh)⩽π−1(35+2126)+76.
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