Equivariant differential form

In differential geometry, an equivariant differential form on a manifold M acted by a compact Lie group G is a polynomial map from the Lie algebra ${\displaystyle {\mathfrak {g}}=\operatorname {Lie} (G)}$ to the space of differential forms on M that is equivariant; i.e., ${\displaystyle \alpha (gX)=g\alpha (X)}$. In other words, an equivariant differential form is an invariant element of ${\displaystyle \mathbb {C} [{\mathfrak {g}}]\otimes \Omega ^{*}(M)}$ (note ${\displaystyle \mathbb {C} [{\mathfrak {g}}]\otimes V}$ is the space of V-valued polynomials.)

For an equivariant differential form ${\displaystyle \alpha }$, the equivariant exterior derivative ${\displaystyle d_{\mathfrak {g}}\alpha }$ of ${\displaystyle \alpha }$ is defined by

${\displaystyle (d_{\mathfrak {g}}\alpha )(X)=d(\alpha (X))-i_{X^{\#}}(\alpha (X))}$

where d is the usual exterior derivative and ${\displaystyle i_{X^{\#}}}$ is the interior product by the fundamental vector field generated by X. It is easy to see ${\displaystyle d_{\mathfrak {g}}\circ d_{\mathfrak {g}}=0}$ (use the fact the Lie derivative of ${\displaystyle \alpha (X)}$ along ${\displaystyle X^{\#}}$ is zero) and this makes the space of equivariant differential forms a complex. One can then put

${\displaystyle H_{G}^{*}(X)=\operatorname {ker} d_{\mathfrak {g}}/\operatorname {im} d_{\mathfrak {g}}}$,

which is called the equivariant cohomology of M (This coincides with the ordinary equivariant cohomology defined in terms of Borel construction.) The definition is due to H. Cartan. The notion has an application to the equivariant index theory.

${\displaystyle d_{\mathfrak {g}}}$-closed or ${\displaystyle d_{\mathfrak {g}}}$-exact forms are often called equivariantly closed or equivariantly exact.

• Berline, Nicole; Getzler, E.; Vergne, Michèle (2004), Heat Kernels and Dirac Operators, Berlin, New York: Springer-Verlag

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