Gleason's problem for harmonic Bergman and Bloch functions on half-spaces

## Abstract Let Ω ⊂ **R**^__n__^ be a bounded convex domain with __C__ ^2^ boundary. Given 0 < __p, q__ ≤ ∞ and a normal weight function __φ__ (__r__ ), let __H~p,q,φ~__ be the harmonic mixed norm space on Ω. In this paper we prove that Gleason's problem (Ω, __a__ , __H~p,q,φ~__ ) is always solvab

On the setting of the unit ball of euclidean n-space, we investigate properties of derivatives of functions in the harmonic Bergman space and the harmonic Bloch space. Our results are (1) size estimates of derivatives of the harmonic Bergman kernel, (2) Gleason's problem, and (3) characterizations i

## Abstract Green's contact functions are constructed for two half‐spaces and two half‐planes for materials with different thermal conductivities. With the aid of these contact functions some bimetal problems are reduced to boundary integral equations along the outer boundary where only the boundar

Comparison of different quadratures for evaluation of the improper wavenumber integrals which arise in evaluation of the Green functions for a viscoelastic half space and harmonic line loadings is investigated. The model is assumed to be of the plane strain type. Extensive testing of the numerical a

This paper deals with a thermal stress problem for contacting half-spaces of different materials having an inclusion of other material. With the aid of the contact tensor of two half spaces the problem is reduced to singular integral equations. Some new theorems on potentials with the contact tensor