This thesis provides a unified framework for the error analysis of non-conforming space discretizations of linear wave equations in time-domain, which can be cast as symmetric hyperbolic systems or second-order wave equations. Such problems can be written as first-order evolution equations in Hilbert spaces with linear monotone operators. We employ semigroup theory for the well-posedness analysis and to obtain stability estimates for the space discretizations. To compare the finite dimensional approximations with the original solution, we use the concept of a lift from the discrete to the continuous space. Time integration with the Crank–Nicolson method is analyzed. In this framework, we derive a priori error bounds for the abstract space s...
We derive an equilibrated a posteriori error estimator for the space (semi) discretization of the sc...
We address the error control of Galerkin discretization (in space) of linear second-order hyperbolic...
Standard discontinuous Galerkin methods, based on piecewise polynomials of degree q=0,1, are conside...
This paper provides a unified error analysis for non-conforming space discretizations of linear wave...
In this work we present a unified error analysis for abstract space discretizations of wave-type equ...
In this paper we consider central fluxes discontinuous Galerkin space discretizations of a general c...
This thesis provides a unified framework for the error analysis for space and time discretizations o...
In this article we prove full discretization error bounds for semilinear second-order evolution equa...
We consider isoparametric finite element discretizations of semilinear acoustic wave equations with ...
$L^2$ 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...
In this paper we study space discretizations of a general class of first- and second-order quasiline...
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 ...
This thesis was submitted for the award of Doctor of Philosophy and was awarded by Brunel University...
We derive an equilibrated a posteriori error estimator for the space (semi) discretization of the sc...
We address the error control of Galerkin discretization (in space) of linear second-order hyperbolic...
Standard discontinuous Galerkin methods, based on piecewise polynomials of degree q=0,1, are conside...
This paper provides a unified error analysis for non-conforming space discretizations of linear wave...
In this work we present a unified error analysis for abstract space discretizations of wave-type equ...
In this paper we consider central fluxes discontinuous Galerkin space discretizations of a general c...
This thesis provides a unified framework for the error analysis for space and time discretizations o...
In this article we prove full discretization error bounds for semilinear second-order evolution equa...
We consider isoparametric finite element discretizations of semilinear acoustic wave equations with ...
$L^2$ 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...
In this paper we study space discretizations of a general class of first- and second-order quasiline...
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 ...
This thesis was submitted for the award of Doctor of Philosophy and was awarded by Brunel University...
We derive an equilibrated a posteriori error estimator for the space (semi) discretization of the sc...
We address the error control of Galerkin discretization (in space) of linear second-order hyperbolic...
Standard discontinuous Galerkin methods, based on piecewise polynomials of degree q=0,1, are conside...