On the fine properties of parabolic measures associated to strongly degenerate parabolic operators of Kolmogorov type

Abstract

We consider strongly degenerate parabolic operators of the form \[ L:=∇X·(A(X,Y,t)∇X)+X·∇Y-∂t \] in unbounded domains \[ =\(X,Y,t)=(x,xm,y,ym,t)∈ Rm-1× R× Rm-1× R× R xm>(x,y,t)\. \] We assume that A=A(X,Y,t) is bounded, measurable and uniformly elliptic (as a matrix in Rm) and concerning and we assume that is what we call an (unbounded) Lipschitz domain: satisfies a uniform Lipschitz condition adapted to the dilation structure and the (non-Euclidean) Lie group underlying the operator L. We prove, assuming in addition that is independent of the variable ym, that satisfies an additional regularity condition formulated in terms of a Carleson measure, and additional conditions on A, that the associated parabolic measure is absolutely continuous with respect to a surface measure and that the associated Radon-Nikodym derivative defines an A∞-weight with respect to the surface measure.