Radius of close-to-convexity and fully starlikeness of harmonic mappings

Kalaj, David; Ponnusamy, Saminathan; Вуоринен, Матти

doi:10.1080/17476933.2012.759565

Cited by 46 publications

(36 citation statements)

References 16 publications

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“…In 1980, Mocanu [10] (see also [13]) proved that if f = h+g is a harmonic mapping in a convex domain Ω such that Re (h (z)) > |g (z)| for all z ∈ Ω, then f is univalent and sense-preserving in Ω. An improved version of this results was given in [8,13]. In order to discuss a general situation, it is appropriate to recall the following result due to Mocanu [10].…”

Section: Lemma B [13]mentioning

confidence: 99%

Harmonic close-to-convex functions and minimal surfaces

Ponnusamy

Rasila

Kaliraj

2013

Complex Variables and Elliptic Equations

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In this paper, we study the family C 0 H of sense-preserving complexvalued harmonic functions f that are normalized close-to-convex functions on the open unit disk D with f z (0) = 0. We derive a sufficient condition for f to belong to the class C 0 H . We take the analytic part of f to be zF (a, b; c; z) or zF (a, b; c; z 2 ) and for a suitable choice of co-analytic part of f , the second complex dilatation w(z) = f z /f z turns out to be a square of an analytic function. Hence f is lifted to a minimal surface expressed by an isothermal parameter. Explicit representation for classes of minimal surfaces are given. Graphs generated by using Mathematica are used for illustration.2010 Mathematics Subject Classification. 30C45 (primary); 31A05, 49Q05, 53C43, 58E20 (secondary).

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Section: Lemma B [13]mentioning

confidence: 99%

Harmonic close-to-convex functions and minimal surfaces

Ponnusamy

Rasila

Kaliraj

2013

Complex Variables and Elliptic Equations

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“…In [13], Chen et al obtained some results of the class M(α, −1/2) with |α| = 1. We refer to [22][23][24][25][26][27][28] for discussions on close-to-convex harmonic mappings.…”

Section: Introductionmentioning

confidence: 99%

On a subclass of close-to-convex harmonic mappings

Sun

Rasila

2016

Complex Variables and Elliptic Equations

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We introduce a new subclass M(α, β) of close-to-convex harmonic mappings in the unit disk, which originates from the work of P. Mocanu on univalent mappings. We also give coefficient estimates, and discuss the Fekete-Szegő problem, for this class of mappings. Furthermore, we consider growth, covering and area theorems of the class. In addition, we determine a disk |z| < r in which the partial sum s m,n (f )(z) is closeto-convex for each function of the class M(α, β). Finally, for certain values of the parameters α and β, we solve the radii problems related to starlikeness and convexity of functions of this class. ARTICLE HISTORY

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“…The reasoning used in a proof of Theorem 2.1 may be applied to the bounds of coefficients of any harmonic functions f = h +ḡ, with an assumption |g ′ (0)| = α and such that the coefficients of the analytic part h satisfy |a n | ≤ B n for n ≥ 1 (here h(z) = z + a 2 z 2 + · · · ). Such approach is also presented in [12].…”

Section: Coefficient and Distortion Resultsmentioning

confidence: 99%