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For potentials $U_{K}^{T} = K * T$ , where $K$ and $T$ are certain Schwartz distributions, an inversion formula for $T$ is derived. Convolutions and Fourier transforms of distributions in $(D_{L}^{'} p)$ -spaces are used. It is shown that the equilibrium distribution with respect to the Riesz kernel of order $α$ , $0 < α < m$ , of a compact subset $E$ of $R^{m}$ has the following property: its restriction to the interior of $E$ is an absolutely continuous measure with analytic density which is expressed by an explicit formula.

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Displaying 141 – 160 of 198

An estimate from below for the Markov constant of a Cantor repeller

An example concerning the topological character of the zero-set of a harmonic function.

An example of a Schroedinger equation with almost periodic potential and nowhere dense spectrum.

An example related to boundedness of subharmonic functions

An extension theorem for supertemperatures.

An extremal plurisubharmonic function associated to a convex pluricomplex Green function with pole at infinity.

An extremal problem for certain subharmonic functions in the plane.

An extremal problem for harmonic measure.

An generalization of the Riesz potential

An infinite-harmonic analogue of a Lelong theorem and infinite-harmonicity cells.

An integral inequality for capacities.

An integral related to the Cauchy transform on the Sierpiński gasket.

An inverse problem for biharmonic equation.

An inversion formula and a note on the Riesz kernel

An operator connected with the third boundary value problem in potential theory

An Optimal Order Multigrid Method for Biharmonic, C1 Finite Element Equations.

Analogies entre espaces hyperboliques réels et l’arbre de Bruhat-Tits sur $ℚ_{p}$

Analysis on local Dirichlet spaces. I. Recurrence, conservativeness and Lp-Liouville properties.

Analytic approach to semiclassical logarithmic potential theory

Analytic capacity and linear measure

Currently displaying 141 – 160 of 198