Finite element exterior calculus, homological techniques, and applications

Douglas N. Arnold, Richard S. Falkt, Ragnar Whither

Research output: Contribution to journalArticlepeer-review

442 Scopus citations

Abstract

Finite element exterior calculus is an approach to the design and understanding of finite element discretizations for a wide variety of systems of partial differential equations. This approach brings to bear tools from differential geometry, algebraic topology, and homological algebra to develop discretizations which are compatible with the geometric, topological, and algebraic structures which underlie well-posedness of the PDE problem being solved. In the finite element exterior calculus, many finite element spaces are revealed as spaces of piecewise polynomial differential forms. These connect to each other in discrete subcomplexes of elliptic differential complexes, and are also related to the continuous elliptic complex through projections which commute with the complex differential. Applications are made to the finite element discretization of a variety of problems, including the Hodge Laplacian, Maxwell's equations, the equations of elasticity, and elliptic eigenvalue problems, and also to preconditioners.

Original languageEnglish (US)
Pages (from-to)1-155
Number of pages155
JournalActa Numerica
Volume15
DOIs
StatePublished - May 2006

Fingerprint Dive into the research topics of 'Finite element exterior calculus, homological techniques, and applications'. Together they form a unique fingerprint.

Cite this