Add to ORKGThis paper investigates oscillation-free stability conditions of numerical methods for linear parabolic partial differential equations with some example extrapolations to nonlinear equations. Not clearly understood, numerical oscillations can create infeasible results. Since oscillation-free behavior is not ensured by stability conditions, a more precise condition would be useful for accurate solutions. Using Von Neumann and spectral analyses, we find and explore oscillation-free conditions for several finite difference schemes. Further relationships between oscillatory behavior and eigenvalues is supported with numerical evidence and proof. Also, evidence suggests that the oscillation-free stability condition for a consistent linearization...
The stability theory for finite difference Initial Boundary-Value approximations to sys-tems of hype...
These lecture notes are designed for a one-semester course on finite-difference methods for paraboli...
Many scientific and engineering problems can be modeled by parabolic partial differential equations ...
The development of practical numerical methods for simulation of partial differential equations lead...
This thesis was submitted for the degree of Doctor of Philosophy and awarded by Brunel University.Th...
The first chapter of the thesis is concerned with the construction of finite difference approximatio...
In this paper a general method is introduced for determining the stability and convergence of differ...
This thesis presents the stability analysis of the numerical method of characteristic (MoC) that is ...
In this paper, classical solutions of nonlinear parabolic partial differential equations with the Ro...
Oscillations are ubiquitous in numerical solutions obtained by high order or even first order scheme...
In trying to solve nonlinear partial differential equations with time dependence using the Galerkin ...
A finite element of Galerkin type semidiscrete method is proposed for numerical solution of a linear...
O objetivo principal deste trabalho é descrever a manifestação da instabilidade numérica em problema...
This thesis is concerned with the Numerical Solution of Partial Differential Equations. Initially so...
It was generally expected that monotone schemes are oscillation-free for hyperbolic conservation law...
The stability theory for finite difference Initial Boundary-Value approximations to sys-tems of hype...
These lecture notes are designed for a one-semester course on finite-difference methods for paraboli...
Many scientific and engineering problems can be modeled by parabolic partial differential equations ...
The development of practical numerical methods for simulation of partial differential equations lead...
This thesis was submitted for the degree of Doctor of Philosophy and awarded by Brunel University.Th...
The first chapter of the thesis is concerned with the construction of finite difference approximatio...
In this paper a general method is introduced for determining the stability and convergence of differ...
This thesis presents the stability analysis of the numerical method of characteristic (MoC) that is ...
In this paper, classical solutions of nonlinear parabolic partial differential equations with the Ro...
Oscillations are ubiquitous in numerical solutions obtained by high order or even first order scheme...
In trying to solve nonlinear partial differential equations with time dependence using the Galerkin ...
A finite element of Galerkin type semidiscrete method is proposed for numerical solution of a linear...
O objetivo principal deste trabalho é descrever a manifestação da instabilidade numérica em problema...
This thesis is concerned with the Numerical Solution of Partial Differential Equations. Initially so...
It was generally expected that monotone schemes are oscillation-free for hyperbolic conservation law...
The stability theory for finite difference Initial Boundary-Value approximations to sys-tems of hype...
These lecture notes are designed for a one-semester course on finite-difference methods for paraboli...
Many scientific and engineering problems can be modeled by parabolic partial differential equations ...