AbstractThis work deals with the efficient numerical solution of nonlinear parabolic problems posed on a two-dimensional domain Ω. We consider a suitable decomposition of domain Ω and we construct a subordinate smooth partition of unity that we use to rewrite the original equation. Then, the combination of standard spatial discretizations with certain splitting time integrators gives rise to unconditionally contractive schemes. The efficiency of the resulting algorithms stems from the fact that the calculations required at each internal stage can be performed in parallel
AbstractWe present a non-overlapping spatial domain decomposition method for the solution of linear–...
AbstractThe paper deals with studying some modifications of the local one-dimensional schemes for so...
We present a non-overlapping spatial domain decomposition method for the solution of linear-quadrati...
The theorems of the approximation for concentrating operators on the non-coordinated grids have been...
This article discusses a splitting extrapolation method for solving second-order parabolic equations...
Using composition procedures, we build up high order splitting methods to solve evolution equations ...
Domain decomposition algorithms for parallel numerical solution of parabolic equations are studied f...
. A new efficient method for solving parabolic systems is presented. The proposed method is based on...
AbstractThis paper deals with an iterative algorithm for domain decomposition applied to solving of ...
We present three parallel solvers for parabolic equation. The solution methods, which are based on n...
This thesis is based on five papers, which all analyse different aspects of splitting schemes when a...
This paper introduces a novel approach for the construction of bulk–surface splitting schemes for se...
AbstractA combination of a time discretization and domain decomposition methods for the solution of ...
Two parallel non-overlapping domain decomposition algorithms for solving parabolic partial different...
AbstractParallel iterative algorithms combining a time discretization and domain decomposition metho...
AbstractWe present a non-overlapping spatial domain decomposition method for the solution of linear–...
AbstractThe paper deals with studying some modifications of the local one-dimensional schemes for so...
We present a non-overlapping spatial domain decomposition method for the solution of linear-quadrati...
The theorems of the approximation for concentrating operators on the non-coordinated grids have been...
This article discusses a splitting extrapolation method for solving second-order parabolic equations...
Using composition procedures, we build up high order splitting methods to solve evolution equations ...
Domain decomposition algorithms for parallel numerical solution of parabolic equations are studied f...
. A new efficient method for solving parabolic systems is presented. The proposed method is based on...
AbstractThis paper deals with an iterative algorithm for domain decomposition applied to solving of ...
We present three parallel solvers for parabolic equation. The solution methods, which are based on n...
This thesis is based on five papers, which all analyse different aspects of splitting schemes when a...
This paper introduces a novel approach for the construction of bulk–surface splitting schemes for se...
AbstractA combination of a time discretization and domain decomposition methods for the solution of ...
Two parallel non-overlapping domain decomposition algorithms for solving parabolic partial different...
AbstractParallel iterative algorithms combining a time discretization and domain decomposition metho...
AbstractWe present a non-overlapping spatial domain decomposition method for the solution of linear–...
AbstractThe paper deals with studying some modifications of the local one-dimensional schemes for so...
We present a non-overlapping spatial domain decomposition method for the solution of linear-quadrati...