S1-invariant symplectic hypersurfaces in dimension 6 and the Fano condition

Abstract

We prove that any symplectic Fano 6-manifold M with a Hamiltonian S1-action is simply connected and satisfies c1 c2(M)=24. This is done by showing that the fixed submanifold M⊂eq M on which the Hamiltonian attains its minimum is diffeomorphic to either a del Pezzo surface, a 2-sphere or a point. In the case when (M)=4, we use the fact that symplectic Fano 4-manifolds are symplectomorphic to del Pezzo surfaces. The case when (M)=2 involves a study of 6-dimensional Hamiltonian S1-manifolds with M diffeomorphic to a surface of positive genus. By exploiting an analogy with the algebro-geometric situation we construct in each such 6-manifold an S1-invariant symplectic hypersurface F(M) playing the role of a smooth fibre of a hypothetical Mori fibration over M. This relies upon applying Seiberg-Witten theory to the resolution of symplectic 4-orbifolds occurring as the reduced spaces of M.