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The weighted Hardy spaces ep (B; ρ) of harmonic functions are introduced on simply connected

We establish a mean value property for the functions which is satisfied to Laplace–Bessel equation

We consider the problem of the optimal recovery of harmonic functions in the ball from inaccurate

-valued harmonic functions in the harmonic Hardy space hp for all p > 1. The result is sharp for p ∈ (1

=h+g‾ be a convex harmonic mapping in the disk D. Then there is a θ∈[0,2π)such that the function h+e iθ g

by introducing the p-Bohr radius for harmonic functions which in turn contains the classical Bohr radius

Weighted Hardy-Type Spaces of Harmonic and Analytic Functions

integral are obtained. The sharp estimates are applied to harmonic and biharmonic functions in the half

)) in the Cauchy statement for an analytic function and an unknown curve Γ. We obtain criteria for Γ to be the unit

In this talk, we are interested to explore more on locally univalent harmonic functions

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