Fej\'er-type positive operator based on Takenaka--Malmquist system on unit circle
Abstract
Let =\k\k=-∞∞ denote the extended Takenaka--Malmquist system on unit circle T and let σn,(f), f∈ L1( T), be the Fej\'er-type operator based on , introduced by V. N. Rusak. We give the convergence criteria for σn,(f) in Banach space X( T):=Lp( T) C( T), p 1. Also we prove the Voronovskaya-type theorem for σn,(f) on class of holomorphic functions representable by Cauchy-type integrals with bounded densities.
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