Faber-Laurent series in variable Smirnov classes

Authors: DANİYAL İSRAFİLZADE, ELİFE GÜRSEL

Abstract: In this work, the maximal convergence properties of partial sums of Faber-Laurent series in the variable exponent Smirnov classes of analytic functions defined on a doubly connected domain of the complex plane are investigated.

Keywords: Faber-Laurent series, variable spaces, maximal convergence

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