Finite element exterior calculus and discrete exterior calculus have been actively used and developed in the last two decades. In this dissertation we first work in the context of finite element exterior calculus, studying the “trimmed serendipity” finite element family by building an implementation of them that allows for analyzing their properties in practice. Then, we apply the trimmed serendipity elements to the monodomain equation, an application problem of interest in cardiac modeling. Finally, we swap to the discrete exterior calculus context where we define and apply a fractional discrete exterior derivative. By using a Python package called Firedrake, we illustrate how to implement the trimmed serendipity finite elements. Using...
We derive a numerical method for Darcy flow, hence also for Poisson's equation in first order form, ...
We present in this dissertation some developments in the discretizations of exterior calculus for pr...
There are very few results on mixed finite element methods on surfaces. A theory for the study of su...
We revisit the theory of Discrete Exterior Calculus (DEC) in 2D for general triangulations, relying ...
This article describes the algorithms, features, and implementation of PyDEC, a Python library for c...
A formulation of elliptic boundary value problems is used to develop the first discrete exterior cal...
This paper describes the algorithms, features and implementation of PyDEC, a Python library for comp...
Among the major applications of discrete exterior calculus (in the sense of Hirani et al) are discre...
We present a local formulation for 2D Discrete Exterior Calculus (DEC) similar to that of the Finite...
textThis thesis studies the approximation of solutions to partial differential equations (PDEs) over...
Finite element method is probably the most popular numerical method used in different fields of appl...
For many decades, researchers agree that designing physics-conserving numerical solvers should be do...
We present an implementation of the trimmed serendipity finite element family, using the open-source...
We present a partial panoramic view of possible contexts and applications of the fractional calculus...
The Discrete Calculus (DC) Approach is introduced as a general methodology for the solution of parti...
We derive a numerical method for Darcy flow, hence also for Poisson's equation in first order form, ...
We present in this dissertation some developments in the discretizations of exterior calculus for pr...
There are very few results on mixed finite element methods on surfaces. A theory for the study of su...
We revisit the theory of Discrete Exterior Calculus (DEC) in 2D for general triangulations, relying ...
This article describes the algorithms, features, and implementation of PyDEC, a Python library for c...
A formulation of elliptic boundary value problems is used to develop the first discrete exterior cal...
This paper describes the algorithms, features and implementation of PyDEC, a Python library for comp...
Among the major applications of discrete exterior calculus (in the sense of Hirani et al) are discre...
We present a local formulation for 2D Discrete Exterior Calculus (DEC) similar to that of the Finite...
textThis thesis studies the approximation of solutions to partial differential equations (PDEs) over...
Finite element method is probably the most popular numerical method used in different fields of appl...
For many decades, researchers agree that designing physics-conserving numerical solvers should be do...
We present an implementation of the trimmed serendipity finite element family, using the open-source...
We present a partial panoramic view of possible contexts and applications of the fractional calculus...
The Discrete Calculus (DC) Approach is introduced as a general methodology for the solution of parti...
We derive a numerical method for Darcy flow, hence also for Poisson's equation in first order form, ...
We present in this dissertation some developments in the discretizations of exterior calculus for pr...
There are very few results on mixed finite element methods on surfaces. A theory for the study of su...