New Trends on Analytic Function Theory

Q2 Mathematics Journal of Complex Analysis Pub Date : 2019-01-15 DOI:10.1155/2019/8320861
S. Bulut, S. Kanas, P. Goswami
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引用次数: 1

Abstract

e theory of analytic functions is one of the outstanding and elegant subjects of classical mathematics. e study of univalent and multivalent functions is a fascinating aspect of the theory of complex variables and its concern primarily with the interplay of analytic structure and geometric behavior of analytic functions. e rudiments of the theory had already emerged in the beginning of the past century in the investigations of Koebe in 1907, Gronwall’s proof of the area theorem in 1914, and Bieberbach’s estimates of the second coefficients in 1916. e important aspects concerning the structure and geometric properties in the theory of analytic functions have been studied in more depth during the last few decades. Application and expansion of the theory of univalent and multivalent functions have been employed in numerous fields including differential equations, partial differential equations, fractional calculus, operators’ theory, and differential subordinations. is special issue published research papers and review articles of the highest quality with appeal to the specialists in a field of complex analysis based on coefficient inequalities of biunivalent functions, application of quasi-subordination for generalized Sakaguchi type functions, certain integral operator related to the Hurwitz–Lerch Zeta function, geometric properties of Cesàro averaging operators, sufficient condition for strongly starlikeness of normalized MittagLeffler function, and entire functions of bounded l-index: its zeros and behavior of partial logarithmic derivatives. We do hope that the distinctive aspects of the issue will bring the reader close to the subject of current research. e most recent developments in the theory will give a thorough and modern approach to the classical theory and presents important and compelling applications to the theory of planar harmonicmappings, quasiconformal functions, and dynamical systems.
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解析函数理论的新动向
解析函数论是古典数学中一门杰出而优美的学科。一元函数和多价函数的研究是复变量理论的一个引人入胜的方面,它主要关注解析函数的结构和几何行为之间的相互作用。这个理论的雏形在上个世纪初就已经出现了:1907年Koebe的研究,1914年Gronwall对面积定理的证明,以及1916年Bieberbach对第二系数的估计。近几十年来,人们对解析函数理论中有关结构和几何性质的几个重要方面进行了更深入的研究。一元函数和多价函数理论在微分方程、偏微分方程、分数微积分、算子理论和微分隶属等许多领域得到了应用和扩展。在复分析领域中,以双一元函数的系数不等式为基础发表了高质量的研究论文和评论文章,广义Sakaguchi型函数的拟隶属性的应用,与Hurwitz-Lerch Zeta函数相关的某些积分算子,Cesàro平均算子的几何性质,归一化MittagLeffler函数强星形的充分条件。以及有界l指数的整个函数:它的零点和部分对数导数的性质。我们确实希望这个问题的不同方面将使读者接近当前研究的主题。该理论的最新发展将为经典理论提供全面和现代的方法,并在平面调和映射、拟共形函数和动力系统理论中提出重要和引人注目的应用。
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来源期刊
Journal of Complex Analysis
Journal of Complex Analysis Mathematics-Analysis
CiteScore
2.40
自引率
0.00%
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0
期刊介绍: Journal of Complex Analysis ceased publication in 2018 and is no longer accepting submissions.
期刊最新文献
New Trends on Analytic Function Theory Generalized Distribution and Its Geometric Properties Associated with Univalent Functions
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