Local Invariants and Geometry of the sub-Laplacian on H-type Foliations

Abstract

H-type foliations (M,H,gH) are studied in the framework of sub-Riemannian geometry with bracket generating distribution defined as the bundle transversal to the fibers. Equipping M with the Bott connection we consider the scalar horizontal curvature H as well as a new local invariant τV induced from the vertical distribution. We extend recent results on the small-time asymptotics of the sub-Riemannanian heat kernel on quaternion-contact (qc-)manifolds due to A. Laaroussi and we express the second heat invariant in sub-Riemannian geometry as a linear combination of H and τV. The use of an analog to normal coordinates in Riemannian geometry that are well-adapted to the geometric structure of H-type foliations allows us to consider the pull-back of Kor\'anyi balls to M. We explicitly obtain the first three terms in the asymptotic expansion of their Popp volume for small radii. Finally, we address the question of when M is locally isometric as a sub-Riemannian manifold to its H-type tangent group.