Editorial Analytic and Harmonic Univalent...
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Editorial Analytic and Harmonic Univalent Functions V. Ravichandran, 1 Om P. Ahuja, 2 and Rosihan M. Ali 3 1 Department of Mathematics, University of Delhi, Delhi 110 007, India 2 Department of Mathematical Sciences, Kent State University, Burton, OH 44021, USA 3 School of Mathematical Sciences, Universiti Sains Malaysia, 11800 USM, Penang, Malaysia Correspondence should be addressed to V. Ravichandran; [email protected] Received 14 October 2014; Accepted 14 October 2014; Published 22 December 2014 Copyright © 2014 V. Ravichandran et al. is is an open access article distributed under the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited. Studies on analytic univalent functions became the focus of intense research with the Bieberbach conjecture posed in 1916 concerning the size of the moduli of the Taylor coefficients of these functions. In efforts towards its resolution, the conjecture inspired the development of several ingeniously different mathematical techniques with powerful influence. ese techniques include Lowner’s parametric representation method, the area method, Grunsky inequalities, and methods of variations. Despite the fact that the conjecture was affirma- tively settled by de Branges in 1985, complex function theory continued to remain a highly active relevant area of research. Closely connected are harmonic univalent mappings, which are widely known to have a wealth of applications. ey arise in the modelling of many physical problems, such as in the study of fluid dynamics and elasticity problems, in the approximation theory of plates subjected to normal loading, and in the investigations of Stokes flow in the engineering and biological transport phenomena. Harmonic mappings are also important to differential geometers because these maps provide isothermal (or conformal) parameters for minimal surfaces. Indeed various properties of minimal surfaces such as the Gauss curvature are studied more effectively through planar harmonic mappings. Although a harmonic map provides a natural generaliza- tion to studies on analytic univalent functions, surprisingly it fails to capture the interest of function theorists for quite a period of time. e defining moment came with the seminal paper by Clunie and Sheil-Small in 1984. ey introduced complex analytic approach in their studies and succeeded in finding viable analogues of the classical growth and distortion theorems, covering theorems, and coefficient estimates in the general setting of planar harmonic mappings. Although there have been substantial steps forward in the studies of harmonic mappings, yet many fundamental questions and conjectures remain unresolved. ere is a great expectation that the “harmonic Koebe function” will play the extremal role in many of these problems, much akin to the role played by the Koebe function in the classical theory of analytic univalent functions. is special issue aims to disseminate recent advances in the studies of complex function theory, harmonic univalent functions, and their connections to produce deeper insights and better understanding. ese are crystallized in the form of original research articles or expository survey papers. e response to this special issue was beyond our expectations. Forty papers were received in several areas of research fields in analytic and harmonic univalent functions. All submitted papers went through a rigorous scrutiny of two or three peer-reviewed processes. Based on the reviewers’ reports and editors’ reviews, thirteen original research articles were selected for inclusion in the special issue. New concepts and techniques in the theory of first, second, and third order differential subordination and super- ordination for analytic functions (as well as nonanalytic functions) were introduced. ese can be found in the three papers entitled “ird-order differential subordination and superordination results for meromorphically multivalent func- tions associated with the Liu-Srivastava operator” (H. Tang et al.), “Differential subordinations for nonanalytic functions” (G. I. Oros and G. Oros), and “Differential subordination Hindawi Publishing Corporation Abstract and Applied Analysis Volume 2014, Article ID 578214, 2 pages http://dx.doi.org/10.1155/2014/578214
Transcript of Editorial Analytic and Harmonic Univalent...
EditorialAnalytic and Harmonic Univalent Functions
V. Ravichandran,1 Om P. Ahuja,2 and Rosihan M. Ali3
1Department of Mathematics, University of Delhi, Delhi 110 007, India2Department of Mathematical Sciences, Kent State University, Burton, OH 44021, USA3School of Mathematical Sciences, Universiti Sains Malaysia, 11800 USM, Penang, Malaysia
Correspondence should be addressed to V. Ravichandran; [email protected]
Received 14 October 2014; Accepted 14 October 2014; Published 22 December 2014
Copyright © 2014 V. Ravichandran et al. This is an open access article distributed under the Creative Commons AttributionLicense, which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properlycited.
Studies on analytic univalent functions became the focus ofintense researchwith the Bieberbach conjecture posed in 1916concerning the size of the moduli of the Taylor coefficientsof these functions. In efforts towards its resolution, theconjecture inspired the development of several ingeniouslydifferent mathematical techniques with powerful influence.These techniques include Lowner’s parametric representationmethod, the areamethod, Grunsky inequalities, andmethodsof variations. Despite the fact that the conjecture was affirma-tively settled by de Branges in 1985, complex function theorycontinued to remain a highly active relevant area of research.
Closely connected are harmonic univalent mappings,which arewidely known to have awealth of applications.Theyarise in the modelling of many physical problems, such as inthe study of fluid dynamics and elasticity problems, in theapproximation theory of plates subjected to normal loading,and in the investigations of Stokes flow in the engineering andbiological transport phenomena. Harmonic mappings arealso important to differential geometers because these mapsprovide isothermal (or conformal) parameters for minimalsurfaces. Indeed various properties of minimal surfaces suchas the Gauss curvature are studied more effectively throughplanar harmonic mappings.
Although a harmonic map provides a natural generaliza-tion to studies on analytic univalent functions, surprisinglyit fails to capture the interest of function theorists for quite aperiod of time. The defining moment came with the seminalpaper by Clunie and Sheil-Small in 1984. They introducedcomplex analytic approach in their studies and succeeded infinding viable analogues of the classical growth and distortion
theorems, covering theorems, and coefficient estimates inthe general setting of planar harmonic mappings. Althoughthere have been substantial steps forward in the studies ofharmonic mappings, yet many fundamental questions andconjectures remain unresolved. There is a great expectationthat the “harmonic Koebe function” will play the extremal rolein many of these problems, much akin to the role playedby the Koebe function in the classical theory of analyticunivalent functions.
This special issue aims to disseminate recent advances inthe studies of complex function theory, harmonic univalentfunctions, and their connections to produce deeper insightsand better understanding. These are crystallized in the formof original research articles or expository survey papers.
The response to this special issue was beyond ourexpectations. Forty papers were received in several areas ofresearch fields in analytic and harmonic univalent functions.All submitted papers went through a rigorous scrutiny oftwo or three peer-reviewed processes. Based on the reviewers’reports and editors’ reviews, thirteen original research articleswere selected for inclusion in the special issue.
New concepts and techniques in the theory of first,second, and third order differential subordination and super-ordination for analytic functions (as well as nonanalyticfunctions) were introduced. These can be found in the threepapers entitled “Third-order differential subordination andsuperordination results for meromorphically multivalent func-tions associated with the Liu-Srivastava operator” (H. Tanget al.), “Differential subordinations for nonanalytic functions”(G. I. Oros and G. Oros), and “Differential subordination
Hindawi Publishing CorporationAbstract and Applied AnalysisVolume 2014, Article ID 578214, 2 pageshttp://dx.doi.org/10.1155/2014/578214
2 Abstract and Applied Analysis
results for analytic functions in the upper half-plane” (H. Tanget al.). The paper “Meromorphic solutions of some algebraicdifferential equations” (J. Lin et al.) provides estimates on thegrowth order of meromorphic solutions of certain algebraicdifferential equations by means of the normal family theory.The paper “A note on entire functions that share two smallfunctions” by J.-F. Chen investigates a close linear relationshipbetween a non-constant entire function under certain condi-tions and its first derivative.
The paper “Upper bound of second Hankel determinantfor certain subclasses of analytic functions” (M.-S. Liu etal.) summarizes works done in the area of the Hankeldeterminant for univalent functions, while the paper “Initialcoefficients of biunivalent functions” (S. K. Lee et al.) givesestimates on the initial coefficients of the Taylor coefficientsof these functions.The paper “Some connections between classU- and 𝛼-convex functions” (E. Aliaga and N. Tuneski) givessufficient conditions for an 𝛼-convex function to be in aspecific class, while the paper “Starlikeness of functions definedby third-order differential inequalities and integral operators”(R. Chandrashekar et al.) determines sufficient conditions foranalytic functions satisfying certain third-order differentialinequalities to be starlike.
Four papers in this issue deal with univalent harmonicmappings. These papers are “Radius constants for functionswith the prescribed coefficient bounds” (O. P. Ahuja et al.),“On certain subclass of harmonic starlike functions” (A. Y.Lashin), “A family of minimal surfaces and univalent planarharmonic mappings” (M. Dorff and S. Muir), and “Landau-type theorems for certain biharmonic mappings” (M.-S. Liuet al.). The first of these four papers, “Radius constants forfunctions with the prescribed coefficient bounds,” establishesa coefficient inequality for sense-preserving harmonic func-tions to compute the bounds for the radius of univalenceand radius of full starlikeness (and convexity) of positiveorder for functions with prescribed coefficient bound on theanalytic part; the second one, “On certain subclass of harmonicstarlike functions,” discusses the geometric properties for anew class of harmonic univalent functions; the third one,“A family of minimal surfaces and univalent planar harmonicmappings,” presents a two-parameter family of minimalsurfaces constructed by lifting a family of planar harmonicmappings, while the fourth one, “Landau-type theoremsfor certain biharmonic mappings,” proves the Landau-typetheorems for biharmonic mappings connected with a linearcomplex operator.
We hope that the papers in this special issue will helpenrich our readers and stimulate further research.
Acknowledgment
Finally we take this opportunity to express our heartfeltgratitude to all contributing authors and to the reviewers forensuring the high standards of the issue.
V. RavichandranOm P. Ahuja
Rosihan M. Ali
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