In the recent years, reformulating the mathematical description of physical laws in an algebraic form using tools from algebraic topology gained popularity in computational physics. Physical variables are defined as fluxes or circulations on oriented geometric elements of a pair of dual interlocked cell complexes, while physical laws are expressed in a metric-free fashion with incidence matrices. The metric and the material information are encoded in the discrete counterpart of the constitutive laws of materials, also referred to as constitutive or material matrices. The stability and consistency of the method is guaranteed by precise properties (symmetry, positive definiteness, consistency) that material matrices have to fulfill. The main ...
Modeling bianisotropic constitutive equations, i.e. magnetoelectric coupling, in electromagnetics si...
We present a technique to construct diagonal material matrices for arbitrary triangular and tetrahed...
Purpose – This paper aims to review various techniques used in computational electromagnetism such a...
In the recent years, reformulating the mathematical description of physical laws in an algebraic for...
By exploiting the geometric structure behind Maxwell\u2019s equations, the so called discrete geomet...
An electromagnetic problem can be discretized on a pair of interlocked primal-dual grids according t...
As a first step, we will investigate the extent of the consistency error for a hexahedral primal gri...
In this paper a novel approach is proposed for constructing discrete counterparts of constitutive eq...
This thesis introduces polyhedral cell shapes into the formalism of the Finite Integration Technique...
We examine the construction of reluctivity and Ohm's constitutive matrices for discrete geometric ap...
In the paper we introduce piecewise uniform edge and face vector functions on a simplicial primal ce...
Modeling bianisotropic constitutive equations, i.e., magnetoelectric coupling, in electromagnetics s...
Finite element simulations in computer graphics are typically based on tetrahedral or hexahedral ele...
Modeling bianisotropic constitutive equations, i.e. magnetoelectric coupling, in electromagnetics si...
We present a technique to construct diagonal material matrices for arbitrary triangular and tetrahed...
Purpose – This paper aims to review various techniques used in computational electromagnetism such a...
In the recent years, reformulating the mathematical description of physical laws in an algebraic for...
By exploiting the geometric structure behind Maxwell\u2019s equations, the so called discrete geomet...
An electromagnetic problem can be discretized on a pair of interlocked primal-dual grids according t...
As a first step, we will investigate the extent of the consistency error for a hexahedral primal gri...
In this paper a novel approach is proposed for constructing discrete counterparts of constitutive eq...
This thesis introduces polyhedral cell shapes into the formalism of the Finite Integration Technique...
We examine the construction of reluctivity and Ohm's constitutive matrices for discrete geometric ap...
In the paper we introduce piecewise uniform edge and face vector functions on a simplicial primal ce...
Modeling bianisotropic constitutive equations, i.e., magnetoelectric coupling, in electromagnetics s...
Finite element simulations in computer graphics are typically based on tetrahedral or hexahedral ele...
Modeling bianisotropic constitutive equations, i.e. magnetoelectric coupling, in electromagnetics si...
We present a technique to construct diagonal material matrices for arbitrary triangular and tetrahed...
Purpose – This paper aims to review various techniques used in computational electromagnetism such a...