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∑ of functions meromorphic and univalent in the exterior of the unit disk. We refine the ranges of the parameter

We consider functions f that are univalent in a plane angular domain of angle απ, 0 < α ≤ 2

This paper is devoted to locally univalent complex-valued biharmonic functions. We obtain

∑ of functions meromorphic and univalent in the exterior of the unit disk. We refine the ranges of the parameter

We consider functions f that are univalent in a plane angular domain of angle απ, 0 < α ≤ 2

domain whose complement with respect to ℂ̄ is convex. We call these functions concave univalent functions

domain whose complement with respect to ℂ̄ is convex. We call these functions concave univalent functions

In this paper we show that there exists a function f bounded and univalent in the unit disk

functions in the region |ζ|>-1 and in the disk |ζ|<-1. We examine the question of univalent variation

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