In this work we present a unified error analysis for abstract space discretizations of wave-type equations with nonlinear quasi-monotone operators. This yields an error bound in terms of discretization and interpolation errors that can be applied to various equations and space discretizations fitting in the abstract setting. We use the unified error analysis to prove novel convergence rates for a non-conforming finite element space discretization of wave equations with nonlinear acoustic boundary conditions and illustrate the error bound by a numerical experiment
In this article we prove full discretization error bounds for semilinear second-order evolution equa...
In this paper we consider central fluxes discontinuous Galerkin space discretizations of a general c...
An estimate is derived for the error committed by the introduction of artificial boundaries and corr...
In this work we present a unified error analysis for abstract space discretizations of nonlinear wav...
This paper provides a unified error analysis for non-conforming space discretizations of linear wave...
This thesis provides a unified framework for the error analysis of non-conforming space discretizati...
We consider isoparametric finite element discretizations of semilinear acoustic wave equations with ...
In this paper we study space discretizations of a general class of first- and second-order quasiline...
$L^2$ error estimates of semi- and full discretisations of wave equations with dynamic boundary cond...
In the present paper, we consider a specific class of non-autonomous wave equations on a smooth, bou...
We study the full discretization of a general class of first- and second-order quasilinear wave-type...
In the present paper we consider a class of quasilinear wave equations on a smooth, bounded domain. ...
This thesis provides a unified framework for the error analysis for space and time discretizations o...
We construct and analyze a second-order implicit–explicit (IMEX) scheme for the time integration of ...
We construct and analyze a second-order implicit-explicit (IMEX) scheme for the time integration of ...
In this article we prove full discretization error bounds for semilinear second-order evolution equa...
In this paper we consider central fluxes discontinuous Galerkin space discretizations of a general c...
An estimate is derived for the error committed by the introduction of artificial boundaries and corr...
In this work we present a unified error analysis for abstract space discretizations of nonlinear wav...
This paper provides a unified error analysis for non-conforming space discretizations of linear wave...
This thesis provides a unified framework for the error analysis of non-conforming space discretizati...
We consider isoparametric finite element discretizations of semilinear acoustic wave equations with ...
In this paper we study space discretizations of a general class of first- and second-order quasiline...
$L^2$ error estimates of semi- and full discretisations of wave equations with dynamic boundary cond...
In the present paper, we consider a specific class of non-autonomous wave equations on a smooth, bou...
We study the full discretization of a general class of first- and second-order quasilinear wave-type...
In the present paper we consider a class of quasilinear wave equations on a smooth, bounded domain. ...
This thesis provides a unified framework for the error analysis for space and time discretizations o...
We construct and analyze a second-order implicit–explicit (IMEX) scheme for the time integration of ...
We construct and analyze a second-order implicit-explicit (IMEX) scheme for the time integration of ...
In this article we prove full discretization error bounds for semilinear second-order evolution equa...
In this paper we consider central fluxes discontinuous Galerkin space discretizations of a general c...
An estimate is derived for the error committed by the introduction of artificial boundaries and corr...