We present a systematic way to implement higher order Whitney forms in numerical methods based on discrete exterior calculus. Given a simplicial mesh, we first refine the mesh into smaller simplices which can be used to define higher order Whitney forms. Cochains on this refined mesh can then be interpolated using higher order Whitney forms. Hence, when the refined mesh is used with methods based on discrete exterior calculus, the solution can be expressed as a higher order Whitney form. We present algorithms for the three required steps: refining the mesh, solving the coefficients of the interpolant, and evaluating the interpolant at a given point. With our algorithms, the order of the Whitney forms one wishes to use can be given as a para...
We present the discrete exterior calculus (DEC) to solve discrete partial differential equations on ...
Abstract In this paper, we present a numerical technique for performing Lie advection of arbitrary d...
In mixed finite element approximations of Hodge Laplace problems associated with the de Rham complex...
Partial differential equations describing various phenomena have a natural expression in terms of di...
Abstract. Low order Whitney elements are widely used for electromagnetic field problems. Higher orde...
We consider new degrees of freedom for higher order differential forms on cubical meshes. The approa...
This chapter introduces the background needed to develop a geometry-based, principled approach to co...
. Conforming finite elements in H(div;\Omega\Gamma and H(curl; \Omega\Gamma can be regarded as dis...
This paper introduces a new computational method to solve differential equations on subdivision surf...
This article describes the algorithms, features, and implementation of PyDEC, a Python library for c...
International audienceLow-order Whitney elements are widely used for electromagnetic field problems....
This paper describes the algorithms, features and implementation of PyDEC, a Python library for comp...
This thesis develops a framework for discretizing field theories that is independent of the chosen c...
The methods of Discrete Exterior Calculus (DEC) have given birth to many new algorithms applicable t...
We present a theory and applications of discrete exterior calculus on simplicial complexes of arbitr...
We present the discrete exterior calculus (DEC) to solve discrete partial differential equations on ...
Abstract In this paper, we present a numerical technique for performing Lie advection of arbitrary d...
In mixed finite element approximations of Hodge Laplace problems associated with the de Rham complex...
Partial differential equations describing various phenomena have a natural expression in terms of di...
Abstract. Low order Whitney elements are widely used for electromagnetic field problems. Higher orde...
We consider new degrees of freedom for higher order differential forms on cubical meshes. The approa...
This chapter introduces the background needed to develop a geometry-based, principled approach to co...
. Conforming finite elements in H(div;\Omega\Gamma and H(curl; \Omega\Gamma can be regarded as dis...
This paper introduces a new computational method to solve differential equations on subdivision surf...
This article describes the algorithms, features, and implementation of PyDEC, a Python library for c...
International audienceLow-order Whitney elements are widely used for electromagnetic field problems....
This paper describes the algorithms, features and implementation of PyDEC, a Python library for comp...
This thesis develops a framework for discretizing field theories that is independent of the chosen c...
The methods of Discrete Exterior Calculus (DEC) have given birth to many new algorithms applicable t...
We present a theory and applications of discrete exterior calculus on simplicial complexes of arbitr...
We present the discrete exterior calculus (DEC) to solve discrete partial differential equations on ...
Abstract In this paper, we present a numerical technique for performing Lie advection of arbitrary d...
In mixed finite element approximations of Hodge Laplace problems associated with the de Rham complex...