On identically closed forms locally constructed from a field
Oct 1, 1990Citations per year
Abstract: (AIP)
Let M be an n‐dimensional manifold with derivative operator ∇a and let B(M) be an arbitrary vector bundle over M, equipped with a connection. A cross section of B defines a field φ on M. Let α be a p‐form on M (with pReferences(10)
Figures(0)
- [1]
- [2]
- [3]
- [4]
- [5]
- [6]
- [7]
- [8]
- [9]
- [10]