AbstractFor the multidimensional Dirichlet problem of the Poisson equation on an arbitrary compact domain, this study examines convergence properties with rates of approximate solutions, obtained by a standard difference scheme over inscribed uniform grids. Sharp quantitative estimates are given by the use of second moduli of continuity of the second single partial derivatives of the exact solution. This is achieved by employing the probabilistic method of simple random walk
International audienceThis article is devoted to the analysis of a Monte-Carlo method to approximate...
In this note we provide a probabilistic proof that Poisson and/or Dirichlet problems in an ellipsoid...
We consider the problem of numerically approximating the solution of an elliptic partial differentia...
For the multidimensional Dirichlet problem of the Poisson equation on an arbitrary compact domain, t...
AbstractFor the multidimensional Dirichlet problem of the Poisson equation on an arbitrary compact d...
AbstractFor a Dirichlet problem of the Poisson equation the present paper discusses some convergence...
For the multidimensional Dirichlet problem of the heat equation on a cylinder, this study examines c...
AbstractA particular case of the Dirichlet problem is solved using the Convergence Theorem for discr...
The Dirichlet problem for both parabolic and elliptic equations is considered. A solution of the cor...
AbstractThe present work is devoted to the a posteriori error estimation for the Poisson equation wi...
23pThe error on a real quantity Y due to the graduation of the measuring instrument may be represent...
Considering the Dirichlet problem for Poisson's equation in two and three dimensions, we derive a po...
Approximations of the Dirac delta distribution are commonly used to create sequences of smooth funct...
In this thesis finite-difference approximations to the three boundary value problems for Poisson’s e...
AbstractPointwise estimates are derived for the kernels associated to the polyharmonic Dirichlet pro...
International audienceThis article is devoted to the analysis of a Monte-Carlo method to approximate...
In this note we provide a probabilistic proof that Poisson and/or Dirichlet problems in an ellipsoid...
We consider the problem of numerically approximating the solution of an elliptic partial differentia...
For the multidimensional Dirichlet problem of the Poisson equation on an arbitrary compact domain, t...
AbstractFor the multidimensional Dirichlet problem of the Poisson equation on an arbitrary compact d...
AbstractFor a Dirichlet problem of the Poisson equation the present paper discusses some convergence...
For the multidimensional Dirichlet problem of the heat equation on a cylinder, this study examines c...
AbstractA particular case of the Dirichlet problem is solved using the Convergence Theorem for discr...
The Dirichlet problem for both parabolic and elliptic equations is considered. A solution of the cor...
AbstractThe present work is devoted to the a posteriori error estimation for the Poisson equation wi...
23pThe error on a real quantity Y due to the graduation of the measuring instrument may be represent...
Considering the Dirichlet problem for Poisson's equation in two and three dimensions, we derive a po...
Approximations of the Dirac delta distribution are commonly used to create sequences of smooth funct...
In this thesis finite-difference approximations to the three boundary value problems for Poisson’s e...
AbstractPointwise estimates are derived for the kernels associated to the polyharmonic Dirichlet pro...
International audienceThis article is devoted to the analysis of a Monte-Carlo method to approximate...
In this note we provide a probabilistic proof that Poisson and/or Dirichlet problems in an ellipsoid...
We consider the problem of numerically approximating the solution of an elliptic partial differentia...