Unit Tangent Bundles, CR Leaf Spaces, and Hypercomplex Structures

Abstract

Unit tangent bundles UM of semi-Riemannian manifolds M are shown to be examples of dynamical Legendrian contact structures, which were defined in recent work [25] of Sykes-Zelenko to generalize leaf spaces of 2-nondegenerate CR manifolds. In doing so, Sykes-Zelenko extended the classification in Porter-Zelenko [20] of regular, 2-nondegenerate CR structures to those that can be recovered from their leaf space. The present paper treats dynamical Legendrian contact structures associated with 2-nondegenerate CR structures which were called "strongly regular" in Porter-Zelenko, named "L-contact structures." Closely related to Lie-contact structures, L-contact manifolds have homogeneous models given by isotropic Grassmannians of complex 2-planes whose algebra of infinitesimal symmetries is one of so(p+2,q+2) or so*(2p+4) for p≥1, q≥0. Each 2-plane in the homogeneous model is a split-quaternionic or quaternionic line, respectively, and more general L-contact structures arise on contact manifolds with hypercomplex structures, unit tangent bundles being a prime example. The Ricci curvature tensor of M is used to define the "Ricci-shifted" L-contact structure on UM, whose Nijenhuis tensor vanishes when M is conformally flat. In the language of Sykes-Zelenko (for M analytic), such UM is the leaf space of a 2-nondegenerate CR manifold which is "recoverable" from UM, providing a new source of examples of 2-nondegenerate CR structures.