Abstract
In exterior calculus on smooth manifolds, the exterior derivative and wedge products are natural with respect to smooth maps between manifolds, that is, these operations commute with pullback. In discrete exterior calculus (DEC), simplicial cochains play the role of discrete forms, the coboundary operator serves as the discrete exterior derivative, and an antisymmetrized cup-like product provides a discrete wedge product. We show that these discrete operations in DEC are natural with respect to abstract simplicial maps. A second contribution is a new averaging interpretation of the discrete wedge product in DEC. We also show that this wedge product is the same as Wilson’s cochain product defined using Whitney and de Rham maps.
Original language | English (US) |
---|---|
Article number | 84 |
Journal | Advances in Computational Mathematics |
Volume | 50 |
Issue number | 4 |
DOIs | |
State | Published - Aug 2024 |
Keywords
- 53Z30
- 57Z20
- 65N22
- Chain rule
- Discrete differential forms
- Morphisms
- Nonlinearity
- Partial differential equations
- Pullback
- Simplicial cochains
- Whitney forms
ASJC Scopus subject areas
- Computational Mathematics
- Applied Mathematics