Faber-Laurent Series in Variable Smirnov Classes | Zendy

Daniyal İSRAFİLZADE | Zendy; Elife GÜRSEL | Zendy

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Faber-Laurent Series in Variable Smirnov Classes

Author(s) -

Daniyal İSRAFİLZADE,

Elife GÜRSEL

Publication year - 2020

Publication title -

turkish journal of mathematics

Language(s) - English

Resource type - Journals

SCImago Journal Rank - 0.454

H-Index - 27

eISSN - 1303-6149

pISSN - 1300-0098

DOI - 10.3906/mat-1911-87

Subject(s) - mathematics , laurent series , series (stratigraphy) , variable (mathematics) , domain (mathematical analysis) , pure mathematics , function series , plane (geometry) , convergence (economics) , exponent , mathematical analysis , combinatorics , power series , geometry , paleontology , economics , biology , economic growth , linguistics , philosophy

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.

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