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Mean-value theorem for B-harmonic functionsWe establish a mean value property for the functions which is satisfied to Laplace–Bessel equation
Hardy spaces, approximation issues and boundary value problemsThe weighted Hardy spaces ep (B; ρ) of harmonic functions are introduced on simply connected
Riesz-Fejér Inequalities for Harmonic Functions-valued harmonic functions in the harmonic Hardy space hp for all p > 1. The result is sharp for p ∈ (1
Rotations of convex harmonic univalent mappings=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
Sharp estimates for integral means for three classes of domainsharmonic function
Mean Value Theorem for Harmonic Functions on Cayley TreeAn analog of the mean value theorem for harmonic functions on Cayley tree is proved in this paper
Bohr Inequalities in Some Classes of Analytic FunctionsBohr Inequalities in Some Classes of Analytic Functions
Fractional weighted spherical mean and maximal inequality for the weighted spherical mean and its application to singular PDEIn this paper we establish a mean value property for the functions which is satisfied to Laplace
Optimal recovery of harmonic functions in the ball from an inaccurately given Radon transformConsider the Hardy space h_2 of functions harmonic in the unit ball Bbb B^{d}subsetBbb R
Optimal recovery of harmonic functions in the ball from inaccurate information on the Radon transformWe consider the problem of the optimal recovery of harmonic functions in the ball from inaccurate
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