We present an implementation of the trimmed serendipity finite element family, using the open source finite element package Firedrake. The new elements can be used seamlessly within the software suite for problems requiring $H^1$, \hcurl, or \hdiv-conforming elements on meshes of squares or cubes. To test how well trimmed serendipity elements perform in comparison to traditional tensor product elements, we perform a sequence of numerical experiments including the primal Poisson, mixed Poisson, and Maxwell cavity eigenvalue problems. Overall, we find that the trimmed serendipity elements converge, as expected, at the same rate as the respective tensor product elements while being able to offer significant savings in the time or memory requir...
Maxwell's equations are a system of partial differential equations of vector fields. Imposing the co...
Firedrake is an automated system for the portable solution of partial differential equations using t...
Version of Firedrake used in 'Optimal-transport-based mesh adaptivity on the plane and sphere using ...
We present an implementation of the trimmed serendipity finite element family, using the open-source...
We present an implementation of the trimmed serendipity finite element family, using the open-source...
This record collates DOIs for the software components used in 'Bringing Trimmed Serendipity Methods ...
Finite element exterior calculus and discrete exterior calculus have been actively used and develope...
International audienceThe paper presents review of the results obtained in constructing models of se...
Many classical finite elements such as the Argyris and Bell elements have long been absent from high...
Firedrake is a new tool for automating the numerical solution of partial differential equations. Fir...
2022 Spring.Includes bibliographical references.The Finite Element Method (FEM) is a versatile numer...
Firedrake is a new tool for automating the numerical solution of partial differential equations. Fir...
Firedrake [1] is a system for solving partial differential equations using finite element methods. I...
The solution of a hybrid finite element method (HFEM) problem is considered. It is shown that a suit...
We conduct a condition number analysis of a Hybrid High-Order (HHO) scheme for the Poisson problem. ...
Maxwell's equations are a system of partial differential equations of vector fields. Imposing the co...
Firedrake is an automated system for the portable solution of partial differential equations using t...
Version of Firedrake used in 'Optimal-transport-based mesh adaptivity on the plane and sphere using ...
We present an implementation of the trimmed serendipity finite element family, using the open-source...
We present an implementation of the trimmed serendipity finite element family, using the open-source...
This record collates DOIs for the software components used in 'Bringing Trimmed Serendipity Methods ...
Finite element exterior calculus and discrete exterior calculus have been actively used and develope...
International audienceThe paper presents review of the results obtained in constructing models of se...
Many classical finite elements such as the Argyris and Bell elements have long been absent from high...
Firedrake is a new tool for automating the numerical solution of partial differential equations. Fir...
2022 Spring.Includes bibliographical references.The Finite Element Method (FEM) is a versatile numer...
Firedrake is a new tool for automating the numerical solution of partial differential equations. Fir...
Firedrake [1] is a system for solving partial differential equations using finite element methods. I...
The solution of a hybrid finite element method (HFEM) problem is considered. It is shown that a suit...
We conduct a condition number analysis of a Hybrid High-Order (HHO) scheme for the Poisson problem. ...
Maxwell's equations are a system of partial differential equations of vector fields. Imposing the co...
Firedrake is an automated system for the portable solution of partial differential equations using t...
Version of Firedrake used in 'Optimal-transport-based mesh adaptivity on the plane and sphere using ...