AbstractThe process of semi-discretization and waveform relaxation are applied to general nonlinear parabolic functional differential equations. Two new theorems are presented, which extend and improve some of the classical results. The first of these theorems gives an upper bound for the norm of the error of finite difference semi-discretization. This upper bound is sharper than the classical error bound. The second of these theorems gives an upper bound for the norm of the error, which is caused by both semi-discretization and waveform relaxation. The focus in the paper is on estimating this error directly without using the upper bound for the error, which is caused by the process of semi-discretization and the upper bound for the error, ...
AbstractWe consider the nonlinear parabolic partial differential equations. We construct a discontin...
The paper introduces a methodology to compute upper and lower bounds for linear-functional outputs o...
The waveform relaxation method and its multigrid acceleration are studied as solution procedures for...
This paper considers a family of spatially semi-discrete approximations, includ-ing boundary treatme...
This paper considers a family of spatially semi-discrete approximations, includ-ing boundary treatme...
Classical implicit residual type error estimators require using an underlying spatial finer mesh to ...
This paper is a continuation of the work of Joel Smoller, Takaaki Nishida, and David Hoff in analyzi...
AbstractIn this paper, we establish error bound analysis for a finite-difference approximation to th...
AbstractWe report a new parallel iterative algorithm for semi-linear parabolic partial differential ...
We prove maximum norm regularity properties of L-stable finite difference methods for linear-second ...
Abstract. The error analysis of preconditioned waveform relaxation iterations for differential syste...
The authors develop a new class of waveform relaxation algorithms for large systems of ordinary diff...
The paper is concerned with initial problems for nonlinear parabolic functional differential equatio...
Consider the ODE (ordinary differential equation) that arises from a semi-discretization (discretiza...
Convergence results are shown for full discretizations of quasilinear parabolic partial differential...
AbstractWe consider the nonlinear parabolic partial differential equations. We construct a discontin...
The paper introduces a methodology to compute upper and lower bounds for linear-functional outputs o...
The waveform relaxation method and its multigrid acceleration are studied as solution procedures for...
This paper considers a family of spatially semi-discrete approximations, includ-ing boundary treatme...
This paper considers a family of spatially semi-discrete approximations, includ-ing boundary treatme...
Classical implicit residual type error estimators require using an underlying spatial finer mesh to ...
This paper is a continuation of the work of Joel Smoller, Takaaki Nishida, and David Hoff in analyzi...
AbstractIn this paper, we establish error bound analysis for a finite-difference approximation to th...
AbstractWe report a new parallel iterative algorithm for semi-linear parabolic partial differential ...
We prove maximum norm regularity properties of L-stable finite difference methods for linear-second ...
Abstract. The error analysis of preconditioned waveform relaxation iterations for differential syste...
The authors develop a new class of waveform relaxation algorithms for large systems of ordinary diff...
The paper is concerned with initial problems for nonlinear parabolic functional differential equatio...
Consider the ODE (ordinary differential equation) that arises from a semi-discretization (discretiza...
Convergence results are shown for full discretizations of quasilinear parabolic partial differential...
AbstractWe consider the nonlinear parabolic partial differential equations. We construct a discontin...
The paper introduces a methodology to compute upper and lower bounds for linear-functional outputs o...
The waveform relaxation method and its multigrid acceleration are studied as solution procedures for...