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On estimates for solutions of systems of convex inequalities inequalities described by convex functions is estimated. As consequences, estimates for the distance from a
Rotations of convex harmonic univalent mappings© 2019 Let f=h+g‾ be a normalized and sense-preserving convex harmonic mapping in the unit disk D
More accurate classes of jensen–type inequalities for convex and operator convex functions-adjoint operators. The first class refers to a usual convexity, while the second one deals with the operator
Estimates for integral means of hyperbolically convex functionsWe prove the Mejia-Pommerenke conjecture that the Taylor coefficients of hyperbolically convex
Estimates for integral means of hyperbolically convex functionsWe prove the Mejia-Pommerenke conjecture that the Taylor coefficients of hyperbolically convex
Concerning the Inequality of Hermite-Hadamard Generalized for convex functions, within the framework of a generalized operator integral. Results are general in nature
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
On mappings related to the gradient of the conformal radiusWe establish a criterion for the gradient ∇R(D, z) of the conformal radius of a convex domain D
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
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