Unimodality of the Betti numbers for Hamiltonian circle actions with index-increasing moment maps

Abstract

The unimodality conjecture posed by Tolman in the conference `Moment maps in Various Geometry" in 2005 states that if (M,w) is a 2n-dimensional smooth compact symplectic manifold equipped with a Hamiltonian circle action with only isolated fixed points, then the sequence of Betti numbers is unimodal. Recently, the author and M. Kim proved that the unimodality holds in eight-dimensional cases by using equivariant cohomology theory. In this paper, we generalize the idea in CK to an arbitrary dimensional case. Also, we prove the conjecture in arbitrary dimension with an assumption that a moment map "index-increasing."