298 L. C. JEFFREY, HAMILTONIAN GROUP ACTIONSfor any YE TmM: in other words the function μx : M---+ IR defined by
μx(m) d~f μ(m)(X)
is the Hamiltonian function generating the vector field X#.
(b) μ: M---+ g * is equivariant (where G acts on g * by the coadjoint action).Remark 1.1. In these lectures we shall only consider actions of compact connected
Lie groups, although the definition of Hamiltonian group action may be extended
to noncompact groups. In particular the term "torus" refers to the compact torus
T ~ U(l)n.Remark 1.2. Existence of moment maps. One sees that Lx#W = d(ix#w) ,so that ix#W is closed. The moment map μ x exists if and only if lx#W is also
exact. The moment map need not always exist: for example, if S^1 acts on T^2 by
eiX : ( ei81, ei82) 1---+ ( ei(8^1 +x), ei82)we see that for the standard symplectic form w = dB 1 A dB2 we have ix#W = dB 2.
Since B2 is only defined mod 2n we see that the moment map does not exist. Con-
ditions guaranteeing the existence of a moment map (other than M being simply
connected) include the hypothesis that G is semisimple ([21], Theorem 26.1); con-
ditions on existence and uniqueness of the moment map can be formulated in terms
of Lie algebra cohomology.1.1. Some elementary properties of moment maps
Proposition 1.3. (Guillemin-Sternberg [19])Im(dμm)l_ = Lie(Stab(m)),
where .l_ denotes the annihilator under the canonical pairing g* ® g ---+ IR.Proof: We have
w(Y;!t,Z) = dμy(Z) = (Y,dμm(Z))
for all Z E TmM. Thus Y annihilates all ~ E Im(dμm) if and only if Y E
Lie( Stab( m)).Corollary 1.4. Zero is a regular valu e ofμ if and only if Stab( m) is finite for all
m E μ-^1 (0). In this situation μ-^1 (0) is a manifold and the action of G on it is
locally free.Example 1.5. Let T be a torus acting on Mand let F c MT be a component of
the fixed point set. Then for any f E F we have dμ f = 0, so μ(F) is a point.Proposition 1.6. (a) If H C G are two groups acting in a Hamiltonian fashion
on a symplectic manifold M, then μ H = n o μc where n : g ---+ h is the projection
map. In other words if XE h then μH(m)(X) = μc(m)(X) for any m EM. One
example that frequently arises is the case when H = T is a maximal torus of a
compact Lie group G.(b) More generally if f : H ---+ G is a Lie group homomorphism, and the two
groups G and H act in a Hamiltonian fashion on a symplectic manifold M, in sucha way that the action is compatible with the homomorphism f, then μH = f* o μc
where f : g ---+ h * is induced from the homomorphism f. (The case (a) is the
special case where f is the inclusion map.)