Trigonometric time integrators are introduced as a class of explicit numerical methods for quasilinear wave equations. Second-order convergence for the semi-discretization in time with these integrators is shown for a sufficiently regular exact solution. The time integrators are also combined with a Fourier spectral method into a fully discrete scheme, for which error bounds are provided without requiring any CFL-type coupling of the discretization parameters. The proofs of the error bounds are based on energy techniques and on the semiclassical Gårding inequality
We construct and analyze a second-order implicit-explicit (IMEX) scheme for the time integration of ...
This thesis provides a unified framework for the error analysis of non-conforming space discretizati...
We introduce a family of high-order time semi-discretizations for semilinear wave equations of Klein...
An error analysis of trigonometric integrators (or exponential integrators) applied to spatial semi-...
In this paper we introduce a class of second-order exponential schemes for the time integration of s...
This thesis provides a unified framework for the error analysis for space and time discretizations o...
We study the full discretization of a general class of first- and second-order quasilinear wave-type...
In this article we prove full discretization error bounds for semilinear second-order evolution equa...
In the present paper we consider a class of quasilinear wave equations on a smooth, bounded domain. ...
For classes of symplectic and symmetric time-stepping methods— trigonometric integrators and the Stö...
In this paper we study space discretizations of a general class of first- and second-order quasiline...
We develop a general convergence analysis for a class of inexact Newton-type regularizations for sta...
We construct and analyze a second-order implicit–explicit (IMEX) scheme for the time integration of ...
The quadratic nonlinear wave equation on a one-dimensional torus with small initial values located i...
A fully discrete approximation of the linear stochastic wave equation driven by additive noise is pr...
We construct and analyze a second-order implicit-explicit (IMEX) scheme for the time integration of ...
This thesis provides a unified framework for the error analysis of non-conforming space discretizati...
We introduce a family of high-order time semi-discretizations for semilinear wave equations of Klein...
An error analysis of trigonometric integrators (or exponential integrators) applied to spatial semi-...
In this paper we introduce a class of second-order exponential schemes for the time integration of s...
This thesis provides a unified framework for the error analysis for space and time discretizations o...
We study the full discretization of a general class of first- and second-order quasilinear wave-type...
In this article we prove full discretization error bounds for semilinear second-order evolution equa...
In the present paper we consider a class of quasilinear wave equations on a smooth, bounded domain. ...
For classes of symplectic and symmetric time-stepping methods— trigonometric integrators and the Stö...
In this paper we study space discretizations of a general class of first- and second-order quasiline...
We develop a general convergence analysis for a class of inexact Newton-type regularizations for sta...
We construct and analyze a second-order implicit–explicit (IMEX) scheme for the time integration of ...
The quadratic nonlinear wave equation on a one-dimensional torus with small initial values located i...
A fully discrete approximation of the linear stochastic wave equation driven by additive noise is pr...
We construct and analyze a second-order implicit-explicit (IMEX) scheme for the time integration of ...
This thesis provides a unified framework for the error analysis of non-conforming space discretizati...
We introduce a family of high-order time semi-discretizations for semilinear wave equations of Klein...