A cohomological lower bound for the transverse LS category of a foliated manifold

Abstract

Let F be a compact Hausdorff foliation on a compact manifold. Let E2>0,=\E2p,q p>0,q≥ 0\ be the subalgebra of cohomology classes with positive transverse degree in the E2 term of the spectral sequence of the foliation. We prove that the saturated transverse Lusternik-Schnirelmann category of F is bounded below by the length of the cup product in E2>0,. Other cohomological bounds are discussed.