In mathematics, cohomology with compact support refers to certain cohomology theories, usually with some condition requiring that cocycles should have compact support.
Let
X
\displaystyle
| \ast(X;R) | |
| H | |
| c |
:=\varinjlimK\subseteqH\ast(X,X\setminusK;R)
| \ast(X;R) | |
| C | |
| c |
\phi:Ci(X;R)\toR
K\subseteqX
\phi
X\setminusK
Let
X
p:X\to\star
p*,p!:Sh(X)\toSh(\star)=Ab
l{F}
X
\displaystyleHi(X,l{F}) = R
| ip | |
| *l{F}, |
\displaystyle
| ip | |
| H | |
| !l{F}. |
l{F}
R
Given a manifold X, let
| k | |
| \Omega | |
| c |
(X)
| q | |
| H | |
| c |
(X)
| \bullet | |
| (\Omega | |
| c |
(X),d)
0\to
| 0 | |
| \Omega | |
| c |
(X)\to
| 1 | |
| \Omega | |
| c |
(X)\to
| 2 | |
| \Omega | |
| c |
(X)\to …
i.e.,
| q | |
| H | |
| c |
(X)
Despite their definition as the homology of an ascending complex, the de Rham groups with compact support demonstrate covariant behavior; for example, given the inclusion mapping j for an open set U of X, extension of forms on U to X (by defining them to be 0 on X–U) is a map
j*:
| \bullet | |
| \Omega | |
| c |
(U)\to
| \bullet | |
| \Omega | |
| c |
(X)
j*:
| q | |
| H | |
| c |
(U)\to
| q | |
| H | |
| c |
(X)
They also demonstrate contravariant behavior with respect to proper maps - that is, maps such that the inverse image of every compact set is compact. Let f: Y → X be such a map; then the pullback
f*: \Omega
| q | |
| c |
(X)\to
| q | |
| \Omega | |
| c |
(Y) \sumIgI
| dx | |
| i1 |
\wedge\ldots\wedge
| dx | |
| iq |
\mapsto \sumI(gI\circf)
| d(x | |
| i1 |
\circf)\wedge\ldots\wedge
| d(x | |
| iq |
\circf)
induces a map
| q | |
| H | |
| c |
(X)\to
| q | |
| H | |
| c |
(Y)
If Z is a submanifold of X and U = X–Z is the complementary open set, there is a long exact sequence
… \to
| q | |
| H | |
| c |
(U)\overset{j*}{\longrightarrow}
| q | |
| H | |
| c |
(X)\overset{i*}{\longrightarrow}
| q | |
| H | |
| c |
(Z)\overset{\delta}{\longrightarrow}
| q+1 | |
| H | |
| c |
(U)\to …
called the long exact sequence of cohomology with compact support. It has numerous applications, such as the Jordan curve theorem, which is obtained for X = R² and Z a simple closed curve in X.
De Rham cohomology with compact support satisfies a covariant Mayer–Vietoris sequence: if U and V are open sets covering X, then
… \to
| q | |
| H | |
| c |
(U\capV)\to
| q | |
| H | |
| c |
(U) ⊕
| q | |
| H | |
| c |
(V)\to
| q | |
| H | |
| c |
(X)\overset{\delta}{\longrightarrow}
| q+1 | |
| H | |
| c |
(U\capV)\to …
where all maps are induced by extension by zero is also exact.