About Three Dimensional Jump Boundary Value Problems for the Laplacian

10/03/2019

∙

The conditions of well-posed solvability of searched function and its normal derivative three dimensional jump problem for the Laplacian and equivalent to them integral equation system for the sum of the simple and double layer potentials are determined in the Hilbert space, element of which as well as their normal derivatives have the jump through boundary surface.

READ FULL TEXT

About Three Dimensional Jump Boundary Value Problems for the Laplacian

About Three Dimensional Double-Sided Dirichlet and Neumann Boundary Value Problems for the Laplacian

Towards coercive boundary element methods for the wave equation

Iterative solution to the biharmonic equation in mixed form discretized by the Hybrid High-Order method

Improved Wall-Normal Derivative Formulae for Anisotropic Adaptive Simplex-Element Grids

An enhancement of the fast time-domain boundary element method for the three-dimensional wave equation

Spectral Fractional Laplacian with Inhomogeneous Dirichlet Data: Questions, Problems, Solutions

Spectrally accurate Ewald summation for the Yukawa potential in two dimensions

About Three Dimensional Jump Boundary Value Problems for the Laplacian

Related Research

About Three Dimensional Double-Sided Dirichlet and Neumann Boundary Value Problems for the Laplacian

Towards coercive boundary element methods for the wave equation

Iterative solution to the biharmonic equation in mixed form discretized by the Hybrid High-Order method

Improved Wall-Normal Derivative Formulae for Anisotropic Adaptive Simplex-Element Grids

An enhancement of the fast time-domain boundary element method for the three-dimensional wave equation

Spectral Fractional Laplacian with Inhomogeneous Dirichlet Data: Questions, Problems, Solutions

Spectrally accurate Ewald summation for the Yukawa potential in two dimensions