We present a method to extend the finite element library FEniCS to solve problems with domains in dimensions above three by constructing tensor product finite elements. This methodology only requires that the high dimensional domain is structured as a Cartesian product of two lower dimensional subdomains. In this study we consider Dirichlet problems for scalar linear partial differential equations, though the methodology can be extended to non-linear problems. The utilization of tensor product finite elements allows us to construct a global system of linear algebraic equations that only relies on the finite element infrastructure of the lower dimensional subdomains contained in FEniCS. We demonstrate the effectiveness of our methodology in ...
We present a brief survey on the modern tensor numerical methods for multidimensional stat...
In engineering, physical phenomena are often described mathematically by partial differential equati...
International audienceIn this paper we study the problem of compute the solution of a linear system ...
Spectral discretization in space and time of the weak formulation of a partial differential equation...
We consider the numerical solution of partial differential equations in partially deformed three-dime...
Mixed-dimensional partial differential equations (PDEs) are equations coupling unknown fields define...
High-dimensional transport equations frequently occur in science and engineering. Computing their nu...
In this paper, we construct, in a unified fashion, lower order finite element subspaces of spaces of...
We consider the problem of solving linear elliptic partial differential equations on a high-dimensio...
This thesis focuses on the constructions and applications of (piecewise) tensor product wavelet base...
Partial differential equations with nonnegative characteristic form arise in numerous mathematical m...
In this paper, we develop a new tensor-product based preconditioner for discontinuous Galerkin metho...
This thesis deals with tensor methods for the numerical solution of parametric partial differential ...
Christoph Lohmann introduces a very general framework for the analysis and design of bound-preservin...
We develop an essentially optimal numerical method for solving two-scale Maxwell wave equations in a...
We present a brief survey on the modern tensor numerical methods for multidimensional stat...
In engineering, physical phenomena are often described mathematically by partial differential equati...
International audienceIn this paper we study the problem of compute the solution of a linear system ...
Spectral discretization in space and time of the weak formulation of a partial differential equation...
We consider the numerical solution of partial differential equations in partially deformed three-dime...
Mixed-dimensional partial differential equations (PDEs) are equations coupling unknown fields define...
High-dimensional transport equations frequently occur in science and engineering. Computing their nu...
In this paper, we construct, in a unified fashion, lower order finite element subspaces of spaces of...
We consider the problem of solving linear elliptic partial differential equations on a high-dimensio...
This thesis focuses on the constructions and applications of (piecewise) tensor product wavelet base...
Partial differential equations with nonnegative characteristic form arise in numerous mathematical m...
In this paper, we develop a new tensor-product based preconditioner for discontinuous Galerkin metho...
This thesis deals with tensor methods for the numerical solution of parametric partial differential ...
Christoph Lohmann introduces a very general framework for the analysis and design of bound-preservin...
We develop an essentially optimal numerical method for solving two-scale Maxwell wave equations in a...
We present a brief survey on the modern tensor numerical methods for multidimensional stat...
In engineering, physical phenomena are often described mathematically by partial differential equati...
International audienceIn this paper we study the problem of compute the solution of a linear system ...