Non-divergence operators structured on homogeneous H\"ormander vector fields: heat kernels and global Gaussian bounds

Abstract

Let X1,...,Xm be a family of real smooth vector fields defined in Rn, 1-homogeneous with respect to a nonisotropic family of dilations and satisfying H\"ormander's rank condition at 0 (and therefore at every point of Rn). The vector fields are not assumed to be translation invariant with respect to any Lie group structure. Let us consider the nonvariational evolution operator H:=Σi,j=1mai,j(t,x)XiXj-∂t% where (ai,j(t,x))i,j=1m is a symmetric uniformly positive m× m matrix and the entries aij are bounded H\"older continuous functions on R1+n, with respect to the "parabolic" distance induced by the vector fields. We prove the existence of a global heat kernel (·;s,y)∈ CX,loc2,α(R1+n\(s,y)\) for H, such that satisfies two-sided Gaussian bounds and ∂t, Xi,XiXj satisfy upper Gaussian bounds on every strip [0,T]×Rn. We also prove a scale-invariant parabolic Harnack inequality for H, and a standard Harnack inequality for the corresponding stationary operator L:=Σi,j=1mai,j(x)XiXj. with H\"older continuos coefficients.