In this contribution we present a new computational method for coupled bulk-surface problems on time-dependent domains. The method is based on a space–time formulation using discontinuous piecewise linear elements in time and continuous piecewise linear elements in space on a fixed background mesh. The domain is represented using a piecewise linear level set function on the background mesh and a cut finite element method is used to discretize the bulk and surface problems. In the cut finite element method the bilinear forms associated with the weak formulation of the problem are directly evaluated on the bulk domain and the surface defined by the level set, essentially using the restrictions of the piecewise linear functions to the computat...
The purpose of this thesis is to improve numerical simulations of surface problems. Two novel comput...
ABSTRACT. In this article we describe a numerical framework for a system of coupled reaction-diffusi...
Problems with time-evolving domains are frequently occurring in computationalfluid dynamics and many...
In this contribution we present a new computational method for coupled bulk-surface problems on time...
We develop a stabilized cut finite element method for the convection problem on a surface based on c...
Interface problems modeled by Partial Differential Equations (PDEs) appear in a wide range of fields...
In this paper, we define a new finite element method for numerically approximating the solution of a...
AbstractIn this work we present the bulk-surface finite element method (BSFEM) for solving coupled s...
We develop a family of cut finite element methods of different orders based on the discontinuous Gal...
We develop a novel cut discontinuous Galerkin (CutDG) method for stationary advection–reaction probl...
This thesis presents numerical techniques for solving problems of incompressible flow coupled to sca...
Large-scale simulations of time-dependent partial differential equations are, at present, largely re...
This thesis deals with cut finite element methods (CutFEM) for solving partial differential equation...
In this paper we consider a coupled bulk-surface PDE in two space dimensions. The model consists of ...
Many advanced engineering problems require the numerical solution of multidomain, multidimension, mu...
The purpose of this thesis is to improve numerical simulations of surface problems. Two novel comput...
ABSTRACT. In this article we describe a numerical framework for a system of coupled reaction-diffusi...
Problems with time-evolving domains are frequently occurring in computationalfluid dynamics and many...
In this contribution we present a new computational method for coupled bulk-surface problems on time...
We develop a stabilized cut finite element method for the convection problem on a surface based on c...
Interface problems modeled by Partial Differential Equations (PDEs) appear in a wide range of fields...
In this paper, we define a new finite element method for numerically approximating the solution of a...
AbstractIn this work we present the bulk-surface finite element method (BSFEM) for solving coupled s...
We develop a family of cut finite element methods of different orders based on the discontinuous Gal...
We develop a novel cut discontinuous Galerkin (CutDG) method for stationary advection–reaction probl...
This thesis presents numerical techniques for solving problems of incompressible flow coupled to sca...
Large-scale simulations of time-dependent partial differential equations are, at present, largely re...
This thesis deals with cut finite element methods (CutFEM) for solving partial differential equation...
In this paper we consider a coupled bulk-surface PDE in two space dimensions. The model consists of ...
Many advanced engineering problems require the numerical solution of multidomain, multidimension, mu...
The purpose of this thesis is to improve numerical simulations of surface problems. Two novel comput...
ABSTRACT. In this article we describe a numerical framework for a system of coupled reaction-diffusi...
Problems with time-evolving domains are frequently occurring in computationalfluid dynamics and many...