Oscillations are ubiquitous in numerical solutions obtained by high order or even first order schemes for hyperbolic problems and are conventionally understood as the consequence of low dissipation effects of underlying numerical schemes. Earlier analysis was done mainly through the effective discrete Fourier analysis for linear problems or the modified equation approach in smooth solution regions. In this paper, a so-called heuristic modified equation is derived when applied to nonlinear problems, particularly for oscillatory modes of solutions whose counterpart in linear problems are high frequency mode solutions, and the dissipation effect is distinguished as a numerical damping and a numerical diffusion. The former is reflected through ...
AbstractReaction-diffusion systems whose kinetics contain a stable limit cycle are an established cl...
The generic structure of solutions of initial value problems of hyperbolic-elliptic systems, also ca...
Reaction-diffusion systems whose kinetics contain a stable limit cycle are an established class of m...
It was generally expected that monotone schemes are oscillation-free for hyperbolic conservation law...
Abstract. We discuss the occurrence of oscillations when using central schemes of the Lax-Friedrichs...
We discuss the occurrence of oscillations when using central schemes of the Lax-Friedrichs type (LFt...
Abstract Due to the growing concentration in the field of the nonlinear oscillators (NOSs), the pres...
The manuscript presents my research on hyperbolic Partial Differential Equations (PDE), especially o...
. We study the behavior of oscillatory solutions to convection-diffusion problems, subject to initia...
In this expository paper a sketch is given of some basic problems that arise when differential equat...
The idea of using a non-linear filtering algorithm to eliminate numerically generated oscillations i...
Abstract A mathematical study on the subject of damped oscillations is expounded, focused on the com...
In this thesis, we study the nonlinear stability of oscillatory traveling wave solutions to a class ...
Hyperbolic systems of conservation laws often have diffusive relaxation terms that lead to a small r...
We study the behavior of oscillatory solutions to convection-diffusion problems, subject to initial ...
AbstractReaction-diffusion systems whose kinetics contain a stable limit cycle are an established cl...
The generic structure of solutions of initial value problems of hyperbolic-elliptic systems, also ca...
Reaction-diffusion systems whose kinetics contain a stable limit cycle are an established class of m...
It was generally expected that monotone schemes are oscillation-free for hyperbolic conservation law...
Abstract. We discuss the occurrence of oscillations when using central schemes of the Lax-Friedrichs...
We discuss the occurrence of oscillations when using central schemes of the Lax-Friedrichs type (LFt...
Abstract Due to the growing concentration in the field of the nonlinear oscillators (NOSs), the pres...
The manuscript presents my research on hyperbolic Partial Differential Equations (PDE), especially o...
. We study the behavior of oscillatory solutions to convection-diffusion problems, subject to initia...
In this expository paper a sketch is given of some basic problems that arise when differential equat...
The idea of using a non-linear filtering algorithm to eliminate numerically generated oscillations i...
Abstract A mathematical study on the subject of damped oscillations is expounded, focused on the com...
In this thesis, we study the nonlinear stability of oscillatory traveling wave solutions to a class ...
Hyperbolic systems of conservation laws often have diffusive relaxation terms that lead to a small r...
We study the behavior of oscillatory solutions to convection-diffusion problems, subject to initial ...
AbstractReaction-diffusion systems whose kinetics contain a stable limit cycle are an established cl...
The generic structure of solutions of initial value problems of hyperbolic-elliptic systems, also ca...
Reaction-diffusion systems whose kinetics contain a stable limit cycle are an established class of m...