A Subelliptic Analogue of Aronson-Serrin's Harnack Inequality

Abstract

We show that the Harnack inequality for a class of degenerate parabolic quasilinear PDE t u=-Xi* Ai(x,t,u,Xu)+ B(x,t,u,Xu), associated to a system of Lipschitz continuous vector fields X=(X1,...,Xm) in in × (0,T) with ⊂ M an open subset of a manifold M with control metric d corresponding to X and a measure dσ follows from the basic hypothesis of doubling condition and a weak Poincar\'e inequality. We also show that such hypothesis hold for a class of Riemannian metrics g collapsing to a sub-Riemannian metric 0 g=g0 uniformly in the parameter 0.