De Rham cohomology Guide, Meaning , Facts, Information and Description
In mathematics, de Rham cohomology is a tool belonging both to algebraic topology and to differential topology, capable of expressing basic topological information about smooth manifolds in a form particularly adapted to computation and the concrete representation of cohomology classes. It is a cohomology theory based on the existence of differential forms with prescribed properties. It is in different, definite senses dual both to singular homology, and to Alexander-Spanier cohomology.The differential k-forms on any smooth manifold M form an abelian group (in fact a real vector space) called
- Ωk(M)
- d:Ωk(M) → Ωk+1(M).
- d 2 = 0;
- exact forms are closed.
- HkDR(M).
De Rham's theorem, proved by Georges de Rham in 1931, states that for a compact oriented smooth manifold M, these groups are isomorphic as real vector spaces with the singular cohomology groupss
- Hp(M;R).
The general Stokes' theorem is an expression of duality between de Rham cohomology and the homology of chains.
For a differential manifold M, we can equip it with some auxiliary Riemannian metric. Then the Laplacian Δ, defined by
Harmonic forms
using the exterior derivative and Hodge dual defines a homogeneous (in grading) linear differential operator acting upon the exterior algebra of differential forms: we can look at its action on each component of degree p separately.
If M is compact and oriented, the dimension of its kernel acting upon the space of p-forms is then equal (by Hodge theory) to that of the de Rham cohomology group in degree p: the Laplacian picks out a unique harmonic form in each cohomology class of closed formss, in particular the space of all harmonic p-forms on M is isomorphic to Hp(M;R).
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