Using the theoretical framework of algebraic flux correction and invariant domain preserving schemes, we introduce a monolithic approach to convex limiting in continuous finite element schemes for linear advection equations, nonlinear scalar conservation laws, and hyperbolic systems. In contrast to fluxcorrected transport (FCT) algorithms that apply limited antidiffusive corrections to bound-preserving low-order solutions, our new limiting strategy exploits the fact that these solutions can be expressed as convex combinations of bar states belonging to a convex invariant set of physically admissible solutions. Each antidiffusive flux is limited in a way which guarantees that the associated bar state remains in the invariant set and...
In this article, we consider the nodal flux extension of classical Eulerian edge flux schemes for li...
Abstract. We propose a class of finite element schemes for systems of hyperbolic con-servation laws,...
We extend our previous analysis of streamline diffusion finite element methods for hyperbolic system...
We investigate the consistency and convergence of flux-corrected finite element approximations in th...
Abstract Flux limiting for hyperbolic systems requires a careful generalization of the design princi...
Summary. Algebraic flux correction schemes of TVD and FCT type are extended to systems of hyperbolic...
This paper is concerned with the development of general-purpose algebraic flux correction schemes fo...
This work extends the algebraic flux correction (AFC) paradigm to finite element discretizations of ...
The flux-corrected transport (FCT) methodology is generalized to implicit finite ele-ment schemes an...
In this paper, we will extend the strict maximum principle preserving flux limiting technique develo...
In this paper, we derive the three-dimensional limiting condition and present three-dimensional limi...
Abstract. A class of finite volume methods based on standard high resolution schemes, but which allo...
In this dissertation we develop high order invariant domain preserving schemes for general hyperboli...
The main purpose of this work is to study continuous finite element methods for hyperbolic problems....
The present paper deals with an efficient and accurate multi-dimensional limiting strategy for hyper...
In this article, we consider the nodal flux extension of classical Eulerian edge flux schemes for li...
Abstract. We propose a class of finite element schemes for systems of hyperbolic con-servation laws,...
We extend our previous analysis of streamline diffusion finite element methods for hyperbolic system...
We investigate the consistency and convergence of flux-corrected finite element approximations in th...
Abstract Flux limiting for hyperbolic systems requires a careful generalization of the design princi...
Summary. Algebraic flux correction schemes of TVD and FCT type are extended to systems of hyperbolic...
This paper is concerned with the development of general-purpose algebraic flux correction schemes fo...
This work extends the algebraic flux correction (AFC) paradigm to finite element discretizations of ...
The flux-corrected transport (FCT) methodology is generalized to implicit finite ele-ment schemes an...
In this paper, we will extend the strict maximum principle preserving flux limiting technique develo...
In this paper, we derive the three-dimensional limiting condition and present three-dimensional limi...
Abstract. A class of finite volume methods based on standard high resolution schemes, but which allo...
In this dissertation we develop high order invariant domain preserving schemes for general hyperboli...
The main purpose of this work is to study continuous finite element methods for hyperbolic problems....
The present paper deals with an efficient and accurate multi-dimensional limiting strategy for hyper...
In this article, we consider the nodal flux extension of classical Eulerian edge flux schemes for li...
Abstract. We propose a class of finite element schemes for systems of hyperbolic con-servation laws,...
We extend our previous analysis of streamline diffusion finite element methods for hyperbolic system...