Transverse Weitzenbock formulas and curvature dimension inequalities on Riemannian foliations with totally geodesic leaves

摘要

We prove a family of Weitzenbock formulas on a Riemannian foliation with totally geodesic leaves. These Weitzenbock formulas are naturally parametrized by the canonical variation of the metric. As a consequence, under natural geometric conditions, the horizontal Laplacian satisfies a generalized curvature dimension inequality. Among other things, this curvature dimension inequality implies Li-Yau estimates for positive solutions of the horizontal heat equation, sharp eigenvalue estimates and a sub-Riemannian BonnetMyers compactness theorem whose assumptions only rely on the intrinsic geometry of the horizontal distribution.