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Avkhadiev–Becker Type Univalence Conditions for Biharmonic Mappings to Avkhadiev- Becker type conditions for analytic functions. Also, we investigate the case where biharmonic
Avkhadiev–Backer type p-valent conditions for biharmonic functionsThis paper is devoted to locally univalent complex-valued biharmonic functions. We obtain
Two sufficient conditions for the univalence of analytic functionsIn this article we obtain sufficient conditions for the univalence of n-symmetric analytic
On Brennan's conjecture for a special class of functions} assuming that the Taylor coefficients of the function log(zf′(z)/f(z)) at zero are nonnegative. We also
Two sufficient conditions for the univalence of analytic functionsIn this article we obtain sufficient conditions for the univalence of n-symmetric analytic
Analytic functions with polar and logarithmic singularities and locally convex boundary values at the infinity and generalize univalent convex functions defined in the exterior of the unit disc. We prove sharp
Chapter 7 Sufficient conditions for univalence and quasiconformal extendibility of analytic functionsChapter 7 Sufficient conditions for univalence and quasiconformal extendibility of analytic
Analytic functions with polar and logarithmic singularities and locally convex boundary values at the infinity and generalize univalent convex functions defined in the exterior of the unit disc. We prove sharp
Bohr–Rogosinski phenomenon for analytic functions and Cesáro operators in the literature on Rogosinski's radii for analytic functions defined on the unit disk |z|<1. In this article, we
Sharp estimates for integral means for three classes of domainsanalytic univalent function
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