On the geometry of almost S-manifolds

Abstract

An f-structure on a manifold M is an endomorphism field φ satisfying φ3+φ=0. We call an f-structure regular if the distribution T=φ is involutive and regular, in the sense of Palais. We show that when a regular f-structure on a compact manifold M is an almost -structure, as defined by Duggal, Ianus, and Pastore, it determines a torus fibration of M over a symplectic manifold. When T = 1, this result reduces to the Boothby-Wang theorem. Unlike similar results due to Blair-Ludden-Yano and Soare, we do not assume that the f-structure is normal. We also show that given an almost S-structure, we obtain an associated Jacobi structure, as well as a notion of symplectization.