Cohomology of Quotients in Real Symplectic Geometry

Abstract

Given a Hamiltonian system (M,ω, G,μ) where (M,ω) is a symplectic manifold, G is a compact connected Lie group acting on (M,ω) with moment map μ:M →g*, then one may construct the symplectic quotient (M//G, ωred) where M//G := μ-1(0)/G. Kirwan used the norm-square of the moment map, |μ|2, as a G-equivariant Morse function on M to derive formulas for the rational Betti numbers of M//G. A real Hamiltonian system (M,ω, G,μ, σ, φ) is a Hamiltonian system along with a pair of involutions (σ:M → M, φ:G → G) satisfying certain compatibility conditions. These imply that the fixed point set Mσ is a Lagrangian submanifold of (M,ω) and that Mσ//Gφ := (μ-1(0) Mσ)/Gφ is a Lagrangian submanifold of (M//G, ωred). In this paper we prove analogues of Kirwan's Theorems that can be used to calculate the Z2-Betti numbers of Mσ//Gφ . In particular, we prove (under appropriate hypotheses) that |μ|2 restricts to a Gφ-equivariantly perfect Morse-Kirwan function on Mσ over Z2 coefficients, describe its critical set using explicit real Hamiltonian subsystems, prove equivariant formality for Gφ acting on Mσ, and combine these results to produce formulas for the Z2-Betti numbers of Mσ//Gφ.