An extension to non-nilpotent groups of Rothschild-Stein lifting method

Abstract

In their celebrated paper of 1976, Rothschild and Stein prove a lifting procedure that locally reduces to a free nilpotent Lie algebra any family of smooth vector fields X1,…,Xq, over a manifold M. Then, a large class of differential operators can be lifted, and fundamental solutions on the lifted space can be re-projected to fundamental solutions of the given operators on M. In case that the Lie algebra g=Lie(X1,…,Xq) is finite dimensional but not nilpotent, this procedure could introduce a strong tilting of the space. In this paper we represent a global construction of a Lie group G associated to g that avoid this tilting problem. In particular Lie(G) g and a right G-action exists over M, faithful and transitive, inducing a natural projection E G M. We represent the group G as a direct product M× Gz where the model fiber Gz has a group structure. We prove that for any simply connected manifold M -- and a vast class of non-simply connected manifolds -- a fundamental solution for a differential operator L=Σα∈ Nq rα· Xα of finite degree over M can be obtained, via a saturation method, from a fundamental solution for the associated lifted operator over the group G. This is a generalization of Biagi and Bonfiglioli analogous result for homogeneous vector fields over M= Rn.