312 L. C. JEFFREY, HAMILTONIAN GROUP ACTIONSSince c 1 (vF,j)/f3F,j(X) is nilpotent, we find that we may define the inverse of ep(X)
byeptX) = e~tX) ~(-lr(c1(VF,j)/f3F,j(X)r;
only a finite number of terms contribute to this sum.
Example 3.9. U(l) actions with isolated fixed points.
Suppose the action of T E U(l) on M has isolated fixed points. Supposethe normal bundle vp = TpM at each fixed point F decomposes as a direct sum
vp ~ EBf= 1 vF,j where each VF,j ~ C and M acts with multiplicity mF,j on VF,j (for
0 '/= mF,j E Z): in other wordst E U(l): Zj E VF,j f-t tmF,jzj.
We then find that the equivariant Euler class isep(X) =(IT mF,j)XN.
j3.3. The abelian localization theorem
A very important localization formula for equivariant cohomology with respect to
torus actions is given by the following theorem.Theorem 3.10. (Berline-Vergne [8]; Atiyah-Bott [3]) Let T be a torus acting
on a manifold M, · and let F index the components F of the fixed point set MT ofthe action of T on M. Let 'T/ E Hf ( M). Then
r TJ(x) = 2: r TJ(x).
JM -r}F ep(X)
FEJProof 1: (Berline-Vergne [8]) Let us assume T = U(l) for simplicity. Define
M € = M - IlF U{ where U{ is an E-neighbourhood (in a suitable equivariant
metric) of the component F of the fixed point set MT. On M €, T acts locally
freely, so we may choose a connection e on M € viewed as the total space of a
principal (orbifold) U(l) bundle (in other words, e is a 1-form on M€ for which
8(V) = 1 where V is the vector field generating the S^1 action). Now for every
equivariant form 'T] E DT(M) for which D'T] = 0, we have that
Applying the equivariant version of Stokes' theorem we see thatr TJ(X) = lim r TJ(X) = L lim r :;(Xl.
JM €->0 JM, F E->0 J au; -It can be shown (see [8] or Section 7.2 of [6]) that as E --> 0, fauF ~~~~ tends to
J
77(X) '
F eF(X)' D
Proof 2: (Atiyah-Bott[3]) We work with the functorial properties of the push-