BOHR PHENOMENON FOR THE SPECIAL FAMILY OF ANALYTIC FUNCTIONS AND HARMONIC MAPPINGS

AbstractLet ${\mathcal{S}}$ denote the set of all univalent analytic functions $f$ of the form $f(z)=z+\sum _{n=2}^{\infty }a_{n}z^{n}$ on the unit disk $|z|<1$. In 1946, Friedman [‘Two theorems on Schlicht functions’, Duke Math. J.13 (1946), 171–177] found that the set ${\mathcal{S}}_{\mathbb{Z}}$ of those functions in ${\mathcal{S}}$ which have integer coefficients consists of only nine functions. In a recent paper, Hiranuma and Sugawa [‘Univalent functions with half-integer coefficients’, Comput. Methods Funct. Theory13(1) (2013), 133–151] proved that the similar set obtained for functions with half-integer coefficients consists of only 21 functions; that is, 12 more functions in addition to these nine functions of Friedman from the set ${\mathcal{S}}_{\mathbb{Z}}$. In this paper, we determine the class of all normalized sense-preserving univalent harmonic mappings $f$ on the unit disk with half-integer coefficients for the analytic and co-analytic parts of $f$. It is surprising to see that there are only 27 functions out of which only six functions in this class are not conformal. This settles the recent conjecture of the authors. We also prove a general result, which leads to a new conjecture.

Download Full-text

Distortion and covering theorems of pluriharmonic mappings

Filomat ◽

10.2298/fil1709749c ◽

2017 ◽

Vol 31 (9) ◽

pp. 2749-2762

Author(s):

Shaolin Chen ◽

Saminathan Ponnusamy

Keyword(s):

Analytic Functions ◽

Harmonic Mappings ◽

Classical Approach ◽

Covering Theorems ◽

Linear Invariant ◽

Planar Harmonic Mappings

The linear-invariant families of analytic functions make it possible to obtain well-known results to broader classes of functions, and are often helpful in obtaining simpler proofs along with new results. Based on this classical approach due to Pommerenke, properties (such as bounds for the derivative, covering and distortion) of a corresponding class of locally quasiconformal and planar harmonic mappings are established by Starkov. Motivated by these works, in this paper, we mainly investigate distortion and covering theorems on some classes of pluriharmonic mappings.

Download Full-text

Composition Operators on Some Banach Spaces of Harmonic Mappings

Journal of Function Spaces ◽

10.1155/2020/9034387 ◽

2020 ◽

Vol 2020 ◽

pp. 1-11

Author(s):

Munirah Aljuaid ◽

Flavia Colonna

Keyword(s):

Banach Spaces ◽

Unit Disk ◽

Besov Spaces ◽

Analytic Functions ◽

Composition Operators ◽

Harmonic Mappings ◽

Open Unit ◽

Open Unit Disk ◽

Zygmund Space ◽

Spaces Of Analytic Functions

We study the composition operators on Banach spaces of harmonic mappings that extend several well-known Banach spaces of analytic functions on the open unit disk in the complex plane, including the α-Bloch spaces, the growth spaces, the Zygmund space, the analytic Besov spaces, and the space BMOA.

Download Full-text

Characterizations of Bloch-Type Spaces of Harmonic Mappings

Journal of Function Spaces ◽

10.1155/2019/5687343 ◽

2019 ◽

Vol 2019 ◽

pp. 1-11 ◽

Cited By ~ 1

Author(s):

Munirah Aljuaid ◽

Flavia Colonna

Keyword(s):

Banach Space ◽

Analytic Functions ◽

Bloch Space ◽

Harmonic Mappings ◽

Open Unit ◽

Open Unit Disk ◽

Space Of Analytic Functions ◽

Type Spaces ◽

Growth Space ◽

Derivatives Of

We study the Banach space BHα (α>0) of the harmonic mappings h on the open unit disk D satisfying the condition supz∈D⁡(1-z2)α(hzz+hz¯z)<∞, where hz and hz¯ denote the first complex partial derivatives of h. We show that several properties that are valid for the space of analytic functions known as the α-Bloch space extend to BHα. In particular, we prove that for α>0 the mappings in BHα can be characterized in terms of a Lipschitz condition relative to the metric defined by dH,α(z,w)=sup⁡{hz-hw:h∈BHα,hBHα≤1}. When α>1, the harmonic α-Bloch space can be viewed as the harmonic growth space of order α-1, while for 0<α<1, BHα is the space of harmonic mappings that are Lipschitz of order 1-α.

Download Full-text

Some Properties and Regions of Variability of Affine Harmonic Mappings and Affine Biharmonic Mappings

International Journal of Mathematics and Mathematical Sciences ◽

10.1155/2009/834215 ◽

2009 ◽

Vol 2009 ◽

pp. 1-14

Author(s):

Sh. Chen ◽

S. Ponnusamy ◽

X. Wang

Keyword(s):

Analytic Functions ◽

Schwarz Lemma ◽

Harmonic Mappings

We first obtain the relations of local univalency, convexity, and linear connectedness between analytic functions and their corresponding affine harmonic mappings. In addition, the paper deals with the regions of variability of values of affine harmonic and biharmonic mappings. The regions (their boundaries) are determined explicitly and the proofs rely on Schwarz lemma or subordination.

Download Full-text

A geometric criterion for decomposition and multivalence

Mathematical Proceedings of the Cambridge Philosophical Society ◽

10.1017/s0305004100065099 ◽

1988 ◽

Vol 103 (3) ◽

pp. 487-495 ◽

Cited By ~ 3

Author(s):

Y. Abu-Muhanna ◽

A. Lyzzaik

Keyword(s):

Univalent Function ◽

Convex Functions ◽

Analytic Functions ◽

Unit Disc ◽

Harmonic Mappings ◽

Decomposition Property ◽

Geometric Criterion

AbstractWe give a quite general geometric criterion for a function analytic in the unit disc to be a polynomial of a univalent function, and hence a criterion for multivalence. We believe that this is the essence why multivalent close-to-convex functions enjoy the latter decomposition property. As another application, we study, as suggested by T. Sheil-Small ‘9’, the geometry of classes of analytic functions which arise from his recent investigation of multivalent harmonic mappings.

Download Full-text

Radius Constants for Functions with the Prescribed Coefficient Bounds

Abstract and Applied Analysis ◽

10.1155/2014/454152 ◽

2014 ◽

Vol 2014 ◽

pp. 1-12 ◽

Cited By ~ 4

Author(s):

Om P. Ahuja ◽

Sumit Nagpal ◽

V. Ravichandran

Keyword(s):

Unit Disk ◽

Univalent Function ◽

Analytic Functions ◽

Harmonic Functions ◽

Harmonic Mappings ◽

Coefficient Bounds ◽

Coefficient Inequality ◽

Coefficient Bound ◽

Radius Of Univalence

For an analytic univalent functionf(z)=z+∑n=2∞anznin the unit disk, it is well-known thatan≤nforn≥2. But the inequalityan≤ndoes not imply the univalence off. This motivated several authors to determine various radii constants associated with the analytic functions having prescribed coefficient bounds. In this paper, a survey of the related work is presented for analytic and harmonic mappings. In addition, we establish a coefficient inequality for sense-preserving harmonic functions to compute the bounds for the radius of univalence, radius of full starlikeness/convexity of orderα (0≤α<1) for functions with prescribed coefficient bound on the analytic part.

Download Full-text

Directional Convexity of Convolutions of Harmonic Functions

International Journal of Mathematics and Mathematical Sciences ◽

10.1155/2019/5731830 ◽

2019 ◽

Vol 2019 ◽

pp. 1-6

Author(s):

Jay M. Jahangiri ◽

Raj Kumar Garg

Keyword(s):

Analytic Functions ◽

Harmonic Functions ◽

Imaginary Axis ◽

Harmonic Mappings ◽

Directional Convexity

Harmonic functions can be constructed using two analytic functions acting as their analytic and coanalytic parts but the prediction of the behavior of convolution of harmonic functions, unlike the convolution of analytic functions, proved to be challenging. In this paper we use the shear construction of harmonic mappings and introduce dilatation conditions that guarantee the convolution of two harmonic functions to be harmonic and convex in the direction of imaginary axis.

Download Full-text

Schwarzian derivative criteria for valence of analytic and harmonic mappings

Mathematical Proceedings of the Cambridge Philosophical Society ◽

10.1017/s0305004107000394 ◽

2007 ◽

Vol 143 (2) ◽

pp. 473-486 ◽

Cited By ~ 11

Author(s):

MARTIN CHUAQUI ◽

PETER DUREN ◽

BRAD OSGOOD

Keyword(s):

Unit Disk ◽

Minimal Surfaces ◽

Analytic Functions ◽

Schwarzian Derivative ◽

Harmonic Mappings ◽

Planar Harmonic Mappings

AbstractFor analytic functions in the unit disk, general bounds on the Schwarzian derivative in terms of Nehari functions are shown to imply uniform local univalence and in some cases finite and bounded valence. Similar results are obtained for the Weierstrass–Enneper lifts of planar harmonic mappings to their associated minimal surfaces. Finally, certain classes of harmonic mappings are shown to have finite Schwarzian norm.

Download Full-text

QUASICONFORMAL EXTENSIONS OF HARMONIC MAPPINGS WITH A COMPLEX PARAMETER

Journal of the Australian Mathematical Society ◽

10.1017/s1446788716000355 ◽

2016 ◽

Vol 102 (3) ◽

pp. 307-315 ◽

Cited By ~ 1

Author(s):

XINGDI CHEN ◽

YUQIN QUE

Keyword(s):

Analytic Functions ◽

Extension Theorem ◽

Sufficient Conditions ◽

Complex Parameter ◽

Quasiconformal Extension ◽

Harmonic Mappings ◽

Maximal Dilatation ◽

The One ◽

Teichmüller Mapping

In this paper, we study quasiconformal extensions of harmonic mappings. Utilizing a complex parameter, we build a bridge between the quasiconformal extension theorem for locally analytic functions given by Ahlfors [‘Sufficient conditions for quasiconformal extension’, Ann. of Math. Stud.79 (1974), 23–29] and the one for harmonic mappings recently given by Hernández and Martín [‘Quasiconformal extension of harmonic mappings in the plane’, Ann. Acad. Sci. Fenn. Math.38 (2) (2013), 617–630]. We also give a quasiconformal extension of a harmonic Teichmüller mapping, whose maximal dilatation estimate is asymptotically sharp.

Download Full-text