AbstractThe original model problem is the two-dimensional heat conduction problem with vanishing initial data and a given Neumann-type boundary condition. In particular, certain choices of the representation formula for the heat potential yield the hypersingular heat operator equation of the first kind. In this paper we concentrate on the problem of solving this hypersingular integral equation. Our approximation method is a Petrov–Galerkin method, where we use collocation with respect to the space variable and Galerkin method with respect to the time variable. The trial functions are tensor products of piecewise cubic (space) and piecewise linear (time) smoothest splines. Stability and convergence of the resulting scheme is proved when the ...
We studied physical problems related to heat transport and the corresponding differential equations,...
We describe a fast high-order accurate method for the solution of the heat equation in domains with ...
This paper is concerning with the 1-D initial–boundary value problem for the hyperbolic heat conduct...
AbstractThe original model problem is the two-dimensional heat conduction problem with vanishing ini...
AbstractThe purpose of this paper is to examine a boundary element collocation method for some parab...
Abstract This thesis summarizes certain boundary element methods applied to some initial and bounda...
Efficient high-order integral equation methods have been developed for solving the boundary value pr...
An initial boundary value problem of hyperbolic partial differential equation derived from Cattaneo’...
Hyperbolic heat conduction problem is solved numerically. The explicit and implicit Euler schemes ar...
AbstractWe describe a fully discrete method for the numerical solution of the hypersingular integral...
This article provides a functional analytical framework for boundary integral equations of the heat ...
AbstractA collocation method for a first-kind integral equation with a hypersingular kernel on an in...
International audienceTwo-dimensional hypersingular equations over a disc are considered. A spectral...
We present a unified boundary integral approach for the stable numerical solution of the ill-posed C...
AbstractIn this paper we consider a direct hypersingular integral approach to solve harmonic problem...
We studied physical problems related to heat transport and the corresponding differential equations,...
We describe a fast high-order accurate method for the solution of the heat equation in domains with ...
This paper is concerning with the 1-D initial–boundary value problem for the hyperbolic heat conduct...
AbstractThe original model problem is the two-dimensional heat conduction problem with vanishing ini...
AbstractThe purpose of this paper is to examine a boundary element collocation method for some parab...
Abstract This thesis summarizes certain boundary element methods applied to some initial and bounda...
Efficient high-order integral equation methods have been developed for solving the boundary value pr...
An initial boundary value problem of hyperbolic partial differential equation derived from Cattaneo’...
Hyperbolic heat conduction problem is solved numerically. The explicit and implicit Euler schemes ar...
AbstractWe describe a fully discrete method for the numerical solution of the hypersingular integral...
This article provides a functional analytical framework for boundary integral equations of the heat ...
AbstractA collocation method for a first-kind integral equation with a hypersingular kernel on an in...
International audienceTwo-dimensional hypersingular equations over a disc are considered. A spectral...
We present a unified boundary integral approach for the stable numerical solution of the ill-posed C...
AbstractIn this paper we consider a direct hypersingular integral approach to solve harmonic problem...
We studied physical problems related to heat transport and the corresponding differential equations,...
We describe a fast high-order accurate method for the solution of the heat equation in domains with ...
This paper is concerning with the 1-D initial–boundary value problem for the hyperbolic heat conduct...