Sublaplacians on Real Flag Manifolds
Abstract
Hypoelliptic differential operators and associated geometries with origins in Lie theory are studied. We prove upper bounds on the dimension of Killing fields of analytic pseudosubriemannian manifolds under certain technical hypotheses. Existence and uniqueness results for adapted complex structures in open subsets of cotangent bundles of analytic subriemannian manifolds are proved. A generalized Lichnerowicz theorem expressing the difference between a connection laplacian and a Dirac laplacian for arbitrary linear connections and quadratic forms is proved, along with a preliminary result in local index theory for subriemannian metrics. We prove general results on the ubiquity of hypoelliptic sublaplacians arising in reductive Lie theory from the natural filtered structure of the tangent bundle of flag manifolds. A framework for studying the heat kernels of such operators from the standpoint of abstract harmonic analysis is developed involving branching the regular representation with respect to the inclusion of a closed subgroup which is transverse to the horizontal distribution of a given sublaplacian. In the compact case explicit formulae are given.
Degree
Ph.D.
Advisors
Baudoin, Purdue University.
Subject Area
Mathematics
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