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On Gakhov’s radius for some classes of functions© 2015, Pleiades Publishing, Ltd. We introduce Gakhov’s radius as the radius of the largest circle
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
On Gakhov’s radius for some classes of functions© 2015, Pleiades Publishing, Ltd. We introduce Gakhov’s radius as the radius of the largest circle
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
On the Inner Radius for Multiply Connected DomainsOn the Inner Radius for Multiply Connected Domains
Uniqueness of the Critical Point of the Conformal Radius: “Method of Déjà vu” of the conformal radius (hyperbolic derivative) to be unique where the mapping function is holomorphic and locally
On extrema of the Mityuk radius for doubly connected domainsWe study extrema of the Mityuk radius depending on the choice of the canonical domain. Turning
Bohr Inequalities in Some Classes of Analytic Functions inequality. An exact estimate in the strong Bohr inequality is obtained and the Bohr–Rogosinski radius for a
Bohr–Rogosinski Inequalities for Bounded Analytic Functions for the harmonic mappings of the form (Formula presented.), where the analytic part (Formula presented.) is bounded
Strict superharmonicity of Mityuk’s function for countably connected domains of simple structureinner mapping (conformal) radius
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