A new subclass of harmonic mappings with positive coefficients
Subject Areas : Complex AnalysisA. R. Haghighi 1 , N. Asghary 2 , A. Sedghi 3
1 - Department of Mathematics, Technical and Vocational, University (TVU), Tehran, Iran
2 - Department of Mathematics, Islamic Azad University, Central Tehran Branch,
Tehran, Iran
3 - Department of Mathematics, Islamic Azad University, Central Tehran Branch,
Tehran, Iran
Keywords: Convex combinations&lrm, , &lrm, extreme points&lrm, , &lrm, harmonic starlike functions&lrm, , &lrm, harmonic univalent functions,
Abstract :
Complex-valued harmonic functions that are univalent andsense-preserving in the open unit disk $U$ can be written as form$f =h+\bar{g}$, where $h$ and $g$ are analytic in $U$.In this paper, we introduce the class $S_H^1(\beta)$, where $1<\beta\leq 2$, andconsisting of harmonic univalent function $f = h+\bar{g}$, where $h$ and $g$ are in the form$h(z) = z+\sum\limits_{n=2}^\infty |a_n|z^n$ and $g(z) =\sum\limits_{n=2}^\infty |b_n|\bar z^n$for which$$\mathrm{Re}\left\{z^2(h''(z)+g''(z)) +2z(h'(z)+g'(z))-(h(z)+g(z))-(z-1)\right\}<\beta.$$It is shown that the members of this class are convex and starlike.We obtain distortions bounds extreme point for functions belonging to this class,and we also show this class is closed underconvolution and convex combinations.
[1] J. Clunie, T. Sheil-Small, Univalent functions, Ann. Acad. Sci. Fenn. Series A. 9 (1984), 3-25.
[2] K. K. Dixit, S. Porwal, A subclass of harmonic univalent functions with positive coefficients, Tamk. J. Math. 41 (3) (2010), 261-269.
[3] A. R. Haghighi, A. Sadeghi, N. Asghary, A subclass of harmonic univalent functions, Acta Univ. Apul. 38 (2014), 1-10.
[4] S. Y. Karpuzogullari, M. Özturk, M. Y. Karadeniz, A subclass of harmonic univalent functions with negative coefficients, App. Math. Comp. 142 (2003), 469-476.
[5] St. Ruscheweyh, Neighborhoods of univalent functions, Proc. Amer. Math. Soc. 81 (1981), 521-528.
[6] H. Silverman, Univalent functions with negative coefficients, J. Math. Anal. App. 220 (1998), 283-289.