Special Issue "Complex Analysis and Geometric Function Theory"

A special issue of Mathematics (ISSN 2227-7390).

Deadline for manuscript submissions: 31 January 2021.

Special Issue Editor

Prof. Dr. Teodor Bulboacă
Website
Guest Editor
Faculty of Mathematics and Computer Science, Babeş-Bolyai University, 400084 Cluj-Napoca, Romania;
Interests: Complex Analysis; Geometric Function Theory

Special Issue Information

The Special Issue Complex Analysis and Geometric Function Theory endeavors to publish research papers of the highest quality with an appeal for specialists in the field of complex analysis and geometric aspects of complex analysis, and to the broad mathematical community. We hope that the distinctive aspects of the Issue will bring the reader close to the subject of current research and leave the way open for a more direct and less ambivalent approach to the topic.

Our goal is to invite the authors to present their original articles, as well as review articles, that will stimulate the continuing efforts in developing new results in these areas of interest. We would hope that this Special Issue will have a great impact on other people in their efforts to broaden their knowledge and investigation and help the researchers to summarize the most recent developments and ideas in these fields.

This Special Issue will invite the authors to present their original articles that provide not only new results or methods but may have a great impact on other people in their efforts to broaden their knowledge and investigation. 

Prof. Dr. Teodor Bulboacă
Guest Editor

Manuscript Submission Information

Manuscripts should be submitted online at www.mdpi.com by registering and logging in to this website. Once you are registered, click here to go to the submission form. Manuscripts can be submitted until the deadline. All papers will be peer-reviewed. Accepted papers will be published continuously in the journal (as soon as accepted) and will be listed together on the special issue website. Research articles, review articles as well as short communications are invited. For planned papers, a title and short abstract (about 100 words) can be sent to the Editorial Office for announcement on this website.

Submitted manuscripts should not have been published previously, nor be under consideration for publication elsewhere (except conference proceedings papers). All manuscripts are thoroughly refereed through a single-blind peer-review process. A guide for authors and other relevant information for submission of manuscripts is available on the Instructions for Authors page. Mathematics is an international peer-reviewed open access monthly journal published by MDPI.

Please visit the Instructions for Authors page before submitting a manuscript. The Article Processing Charge (APC) for publication in this open access journal is 1200 CHF (Swiss Francs). Submitted papers should be well formatted and use good English. Authors may use MDPI's English editing service prior to publication or during author revisions.

Keywords

  • Harmonic functions Univalent functions Meromorphic functions Differential subordination and superordination
  • Complex polynomials
  • Special functions and its applications in geometric function theory
  • Quantum calculus and its applications in geometric function theory
  • Operators on function spaces
  • Nevanlinna theory
  • Quasiconformal maps

Published Papers (1 paper)

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Research

Open AccessArticle
Hankel Determinants for New Subclasses of Analytic Functions Related to a Shell Shaped Region
Mathematics 2020, 8(6), 1041; https://doi.org/10.3390/math8061041 - 26 Jun 2020
Abstract
Using the operator L c a defined by Carlson and Shaffer, we defined a new subclass of analytic functions ML c a ( λ ; ψ ) defined by a subordination relation to the shell shaped function ψ ( z ) = z [...] Read more.
Using the operator L c a defined by Carlson and Shaffer, we defined a new subclass of analytic functions ML c a ( λ ; ψ ) defined by a subordination relation to the shell shaped function ψ ( z ) = z + 1 + z 2 . We determined estimate bounds of the four coefficients of the power series expansions, we gave upper bound for the Fekete–SzegőSzegő functional and for the Hankel determinant of order two for f ML c a ( λ ; ψ ) . Full article
(This article belongs to the Special Issue Complex Analysis and Geometric Function Theory)
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