AbstractThe boundary element method (boundary integral equation method) is considered for the Dirichlet problem of the heat equation. The method of collocations on the boundary using finite-element basis is applied to the discretization of the Volterra integral equation of the first kind. Ill-posed properties of the coefficient matrices are discussed
To solve a problem by the boundary element method requires a solution of an integral equation. By di...
International audienceIn this work, we propose a new approach for solving the heat equation within t...
Vita.The heat equation is a basic partial differential equation modelling heat conduction. Many nume...
AbstractThe boundary element method (boundary integral equation method) is considered for the Dirich...
The object of this paper is to study some boundary element methods for the heat equation. Two approa...
Among the classical operators of mathematical physics the Laplacian plays an important role due to t...
Among the classical operators of mathematical physics the Laplacian plays an important role due to t...
The boundary integral equation (BIE) method has been used more and more in the last 20 years for sol...
Over the years, the Finite element method (FEM) and Boundary element method has proven to be and eff...
Over the years, the Finite element method (FEM) and Boundary element method has proven to be and eff...
We present solution of Laplace equation using collocation method and boundary elements
SIGLELD:D46933/83 / BLDSC - British Library Document Supply CentreGBUnited Kingdo
Abstract This thesis summarizes certain boundary element methods applied to some initial and bounda...
This paper deals with the numerical solution of the retarded potential integral equation using a col...
A boundary element method (BEM) is obtained for the nonlinear transient heat conduction problem of i...
To solve a problem by the boundary element method requires a solution of an integral equation. By di...
International audienceIn this work, we propose a new approach for solving the heat equation within t...
Vita.The heat equation is a basic partial differential equation modelling heat conduction. Many nume...
AbstractThe boundary element method (boundary integral equation method) is considered for the Dirich...
The object of this paper is to study some boundary element methods for the heat equation. Two approa...
Among the classical operators of mathematical physics the Laplacian plays an important role due to t...
Among the classical operators of mathematical physics the Laplacian plays an important role due to t...
The boundary integral equation (BIE) method has been used more and more in the last 20 years for sol...
Over the years, the Finite element method (FEM) and Boundary element method has proven to be and eff...
Over the years, the Finite element method (FEM) and Boundary element method has proven to be and eff...
We present solution of Laplace equation using collocation method and boundary elements
SIGLELD:D46933/83 / BLDSC - British Library Document Supply CentreGBUnited Kingdo
Abstract This thesis summarizes certain boundary element methods applied to some initial and bounda...
This paper deals with the numerical solution of the retarded potential integral equation using a col...
A boundary element method (BEM) is obtained for the nonlinear transient heat conduction problem of i...
To solve a problem by the boundary element method requires a solution of an integral equation. By di...
International audienceIn this work, we propose a new approach for solving the heat equation within t...
Vita.The heat equation is a basic partial differential equation modelling heat conduction. Many nume...
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