Symplectic forms on the space of embedded symplectic surfaces and their reductions

Abstract

Let (M,ω) be a symplectic manifold, and (,σ) a closed connected symplectic 2-manifold. We construct a weakly symplectic form ωD(, σ) on the space of immersions M that is a special case of Donaldson's form. We show that the restriction of ωD(,σ) to any orbit of the group of Hamiltonian symplectomorphisms through a symplectic embedding (,σ) (M,ω) descends to a weakly symplectic form ωD on the quotient by Sympl(,σ), and that the obtained symplectic space is a symplectic quotient of the subspace of symplectic embeddings Se(,σ) with respect to the Sympl(,σ)-action. We also compare ωD(,σ) and its reduction ωD to another 2-form on the space of immersed symplectic -surfaces in M. We conclude by a result on the restriction of ωD(,σ) to moduli spaces of J-holomorphic curves.