New Trends in Geometric Function Theory
1Faculty of Mathematics and Computer Science, Babeş-Bolyai University, 400084 Cluj-Napoca, Romania
2Department of Mathematics, Faculty of Science, University of Mansoura, Mansoura 35516, Egypt
3Department of Applied Mathematics, Pukyong National University, Busan 608-737, South Korea
4Department of Mathematics, Rzeszów University of Technology, 35-959 Rzeszów, Poland
5Department of Mathematics, Faculty of Civil Engineering, Belgrade University, Belgrade, Serbia
New Trends in Geometric Function Theory
Description
Geometric function theory is the branch of complex analysis which deals with the geometric properties of analytic functions. It was founded around the turn of the twenteenth century and has remained one of the active fields of the current research. Moreover, in spite the famous coefficient problem, “Bieberbach conjecture”, was solved by Louis de Branges in 1984, it suggests us various approaches and directions for the study of geometric function theory. It is very important for us to find new observational and theoretical results in this field with various applications. The cornerstone of geometric function theory is the theory of univalent functions, but new related topics appeared and developed with many interesting results and applications.
We invite authors to present their original articles as well as review articles that will stimulate the continuing efforts in developing new results in geometric function theory. The special issue will become an international forum for researches to summarize the most recent developments and ideas in this field. The main aim of the special issue of our journal is to invite the authors to present their original articles which not only provide new results or methods but also may have a great impact on other people in their efforts to broaden their knowledge and investigation. Review articles with some open problems are also welcome. The topics to be covered include, but are not limited to:
- Conformal mapping theory
- Differential subordinations and superordinations
- Entire and meromorphic functions
- Fractional calculus with applications
- General theory of univalent and multivalent functions
- Harmonic functions
- Quasiconformal mappings
Before submission authors should carefully read over the journal's Author Guidelines, which are located at http://www.hindawi.com/journals/ijmms/guidelines/. Prospective authors should submit an electronic copy of their complete manuscript through the journal Manuscript Tracking System at http://mts.hindawi.com/ according to the following timetable: