For classes of symplectic and symmetric time-stepping methods - trigonometric integrators and the Stšrmer-Verlet or leapfrog method - applied to spectral semi-discretizations of semilinear wave equations in a weakly nonlinear setting, it is shown that energy, momentum, and all harmonic actions are approximately preserved over long times. For the case of interest where the CFL number is not a small parameter, such results are outside the reach of standard backward error analysis. Here, they are instead obtained via a modulated Fourier expansion in time
The problem is to combine explicit time and mimetic spatial discretizations for wave equations so th...
How well do multisymplectic discretisations preserve travelling wave solutions? To answer this quest...
The long time–evolution of disturbances to slowly–varying solutions of partial differential equation...
For classes of symplectic and symmetric time-stepping methods- trigonometric integrators and the St\...
The long-time behaviour of spectral semi-discretisations of weakly nonlinear wave equations is analy...
The long-time behaviour of spectral semi-discretisations of weakly non-linear wave equations is anal...
We prove that a standard second order ¯nite di®erence uniform space discretization of the semilinear...
In this paper we discuss energy conservation issues related to the numerical solution of the semilin...
In this paper we discuss energy conservation issues related to the numerical solution of the nonline...
This dissertation presents results of the study on symplectic and multisymplectic numerical methods ...
This paper discuses some novel results concerning the wave action conservation law for multisymplect...
An error analysis of trigonometric integrators (or exponential integrators) applied to spatial semi-...
This paper discuses some novel results concerning the wave action conservation law for multisymplect...
A variety of numerical methods are applied to solving the wave equations u_tt = u_xx and u_tt = u_xx...
The quadratic nonlinear wave equation on a one-dimensional torus with small initial values located i...
The problem is to combine explicit time and mimetic spatial discretizations for wave equations so th...
How well do multisymplectic discretisations preserve travelling wave solutions? To answer this quest...
The long time–evolution of disturbances to slowly–varying solutions of partial differential equation...
For classes of symplectic and symmetric time-stepping methods- trigonometric integrators and the St\...
The long-time behaviour of spectral semi-discretisations of weakly nonlinear wave equations is analy...
The long-time behaviour of spectral semi-discretisations of weakly non-linear wave equations is anal...
We prove that a standard second order ¯nite di®erence uniform space discretization of the semilinear...
In this paper we discuss energy conservation issues related to the numerical solution of the semilin...
In this paper we discuss energy conservation issues related to the numerical solution of the nonline...
This dissertation presents results of the study on symplectic and multisymplectic numerical methods ...
This paper discuses some novel results concerning the wave action conservation law for multisymplect...
An error analysis of trigonometric integrators (or exponential integrators) applied to spatial semi-...
This paper discuses some novel results concerning the wave action conservation law for multisymplect...
A variety of numerical methods are applied to solving the wave equations u_tt = u_xx and u_tt = u_xx...
The quadratic nonlinear wave equation on a one-dimensional torus with small initial values located i...
The problem is to combine explicit time and mimetic spatial discretizations for wave equations so th...
How well do multisymplectic discretisations preserve travelling wave solutions? To answer this quest...
The long time–evolution of disturbances to slowly–varying solutions of partial differential equation...