Difference between revisions of "De Rham theorem"
From Encyclopedia of Mathematics
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| + | A theorem expressing the real cohomology groups of a differentiable manifold $ M $ | ||
| + | in terms of the complex of differential forms (cf. [[Differential form|Differential form]]) on $ M $. | ||
| + | If $ E ^ {*} ( M) = \sum _ {p = 0 } ^ {n} E ^ {p} ( M) $ | ||
| + | is the de Rham complex of $ M $, | ||
| + | where $ E ^ {p} ( M) $ | ||
| + | is the space of all infinitely-differentiable $ p $- | ||
| + | forms on $ M $ | ||
| + | equipped with the exterior differentiation, then de Rham's theorem establishes an isomorphism between the graded cohomology algebra $ H ^ {*} ( E ^ {*} ( M)) $ | ||
| + | of the complex $ E ^ {*} ( M) $ | ||
| + | and the cohomology algebra $ H ^ {*} ( M, \mathbf R ) $ | ||
| + | of $ M $ | ||
| + | with values in $ \mathbf R $. | ||
| + | An explicit interpretation of this isomorphism is that to each closed $ p $- | ||
| + | form $ \omega $ | ||
| + | there is associated a linear form $ \gamma \rightarrow \int _ \gamma \omega $ | ||
| + | on the space of $ p $- | ||
| + | dimensional singular cycles $ \gamma $ | ||
| + | in $ M $. | ||
The theorem was first established by G. de Rham [[#References|[1]]], although the idea of a connection between cohomology and differential forms goes back to H. Poincaré. | The theorem was first established by G. de Rham [[#References|[1]]], although the idea of a connection between cohomology and differential forms goes back to H. Poincaré. | ||
| − | There are various versions of de Rham's theorem. For example, the cohomology algebra | + | There are various versions of de Rham's theorem. For example, the cohomology algebra $ H ^ {*} ( E _ {c} ^ {*} ( M)) $ |
| + | of the complex $ E _ {c} ^ {*} ( M) $ | ||
| + | of forms with compact supports is isomorphic to the real cohomology algebra $ H _ {c} ^ {*} ( M, \mathbf R ) $ | ||
| + | of the manifold $ M $ | ||
| + | with compact supports. The cohomology of $ M $ | ||
| + | with values in a locally constant sheaf of vector spaces is isomorphic to the cohomology of the complex of differential forms with values in the corresponding flat vector bundle [[#References|[3]]]. The cohomology of a simplicial set $ S $ | ||
| + | with values in any field $ k $ | ||
| + | of characteristic 0 is isomorphic to the cohomology of the corresponding de Rham polynomial complex over $ k $. | ||
| + | In the case when $ S $ | ||
| + | is the singular complex of an arbitrary topological space $ X $ | ||
| + | one obtains in this way a graded-commutative differential graded $ k $- | ||
| + | algebra $ A _ { \mathop{\rm dR} } ( X) $ | ||
| + | with cohomology algebra $ H ^ {*} ( A _ { \mathop{\rm dR} } ( X)) $ | ||
| + | isomorphic to the singular cohomology algebra $ H ^ {*} ( X, k) $( | ||
| + | see [[#References|[4]]]). If $ X $ | ||
| + | is a smooth affine algebraic variety over $ \mathbf C $, | ||
| + | then the cohomology algebra $ H ^ {*} ( X, \mathbf C ) $ | ||
| + | is isomorphic to the cohomology algebra of the complex of regular differential forms on $ M $( | ||
| + | see [[De Rham cohomology|de Rham cohomology]]). | ||
====References==== | ====References==== | ||
| − | <table>< | + | <table><tr><td valign="top">[1]</td> <td valign="top"> G. de Rham, "Sur l'analysis situs des variétés à $n$ dimensions" ''J. Math. Pures Appl. Sér. 9'' , '''10''' (1931) pp. 115–200</td></tr><tr><td valign="top">[2]</td> <td valign="top"> G. de Rham, "Differentiable manifolds" , Springer (1984) (Translated from French)</td></tr><tr><td valign="top">[3]</td> <td valign="top"> M.S. Raghunathan, "Discrete subgroups of Lie groups" , Springer (1972)</td></tr><tr><td valign="top">[4]</td> <td valign="top"> D. Lehmann, "Théorie homotopique des forms différentiélles (d'après D. Sullivan)" ''Astérisque'' , '''45''' (1977)</td></tr></table> |
Latest revision as of 17:01, 1 July 2020
A theorem expressing the real cohomology groups of a differentiable manifold $ M $
in terms of the complex of differential forms (cf. Differential form) on $ M $.
If $ E ^ {*} ( M) = \sum _ {p = 0 } ^ {n} E ^ {p} ( M) $
is the de Rham complex of $ M $,
where $ E ^ {p} ( M) $
is the space of all infinitely-differentiable $ p $-
forms on $ M $
equipped with the exterior differentiation, then de Rham's theorem establishes an isomorphism between the graded cohomology algebra $ H ^ {*} ( E ^ {*} ( M)) $
of the complex $ E ^ {*} ( M) $
and the cohomology algebra $ H ^ {*} ( M, \mathbf R ) $
of $ M $
with values in $ \mathbf R $.
An explicit interpretation of this isomorphism is that to each closed $ p $-
form $ \omega $
there is associated a linear form $ \gamma \rightarrow \int _ \gamma \omega $
on the space of $ p $-
dimensional singular cycles $ \gamma $
in $ M $.
The theorem was first established by G. de Rham [1], although the idea of a connection between cohomology and differential forms goes back to H. Poincaré.
There are various versions of de Rham's theorem. For example, the cohomology algebra $ H ^ {*} ( E _ {c} ^ {*} ( M)) $ of the complex $ E _ {c} ^ {*} ( M) $ of forms with compact supports is isomorphic to the real cohomology algebra $ H _ {c} ^ {*} ( M, \mathbf R ) $ of the manifold $ M $ with compact supports. The cohomology of $ M $ with values in a locally constant sheaf of vector spaces is isomorphic to the cohomology of the complex of differential forms with values in the corresponding flat vector bundle [3]. The cohomology of a simplicial set $ S $ with values in any field $ k $ of characteristic 0 is isomorphic to the cohomology of the corresponding de Rham polynomial complex over $ k $. In the case when $ S $ is the singular complex of an arbitrary topological space $ X $ one obtains in this way a graded-commutative differential graded $ k $- algebra $ A _ { \mathop{\rm dR} } ( X) $ with cohomology algebra $ H ^ {*} ( A _ { \mathop{\rm dR} } ( X)) $ isomorphic to the singular cohomology algebra $ H ^ {*} ( X, k) $( see [4]). If $ X $ is a smooth affine algebraic variety over $ \mathbf C $, then the cohomology algebra $ H ^ {*} ( X, \mathbf C ) $ is isomorphic to the cohomology algebra of the complex of regular differential forms on $ M $( see de Rham cohomology).
References
| [1] | G. de Rham, "Sur l'analysis situs des variétés à $n$ dimensions" J. Math. Pures Appl. Sér. 9 , 10 (1931) pp. 115–200 |
| [2] | G. de Rham, "Differentiable manifolds" , Springer (1984) (Translated from French) |
| [3] | M.S. Raghunathan, "Discrete subgroups of Lie groups" , Springer (1972) |
| [4] | D. Lehmann, "Théorie homotopique des forms différentiélles (d'après D. Sullivan)" Astérisque , 45 (1977) |
How to Cite This Entry:
De Rham theorem. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=De_Rham_theorem&oldid=13456
De Rham theorem. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=De_Rham_theorem&oldid=13456
This article was adapted from an original article by A.L. Onishchik (originator), which appeared in Encyclopedia of Mathematics - ISBN 1402006098. See original article