A conformal integral invariant on Riemannian foliations

Abstract

Let M be a closed manifold which admits a foliation structure F of codimension q≥ 2 and a bundle-like metric g0. Let [g0]B be the space of bundle-like metrics which differ from g0 only along the horizontal directions by a multiple of a positive basic function. Assume Y is a transverse conformal vector field and the mean curvature of the leaves of (M,F,g0) vanishes. We show that the integral ∫MY(RTgT)dμg is independent of the choice of g∈ [g0]B, where gT is the transverse metric induced by g and RT is the transverse scalar curvature. Moreover if q≥ 3, we have ∫MY(RTgT)dμg=0 for any g∈ [g0]B. However there exist codimension 2 minimal Riemannian foliations (M,F,g) and transverse conformal vector fields Y such that ∫MY(RTgT)dμg≠ 0. Therefore, it is a nontrivial obstruction for the transverse Yamabe problem on minimal Riemannian foliation of codimension 2.