Global Lp estimates for degenerate Ornstein-Uhlenbeck operators with variable coefficients

Abstract

We consider a class of degenerate Ornstein-Uhlenbeck operators in RN, of the kind [AΣi,j=1p0aij(x) ∂xixj2+Σi,j=1Nbijxi∂xj%] where (aij) is symmetric uniformly positive definite on Rp0 (p0≤ N), with uniformly continuous and bounded entries, and (bij) is a constant matrix such that the frozen operator Ax0 corresponding to aij(x0) is hypoelliptic. For this class of operators we prove global Lp estimates (1<p<∞) of the kind:% [|∂xixj2u|Lp(R% N)≤ c|Au|Lp(RN)+|u|Lp(R% N) for i,j=1,2,...,p0.] We obtain the previous estimates as a byproduct of the following one, which is of interest in its own:% [|∂xixj2u|Lp(ST)≤ c|Lu|Lp(ST)+|u|Lp(ST)] for any u∈ C0∞(ST), where ST is the strip RN×[-T,T], T small, and L is the Kolmogorov-Fokker-Planck operator% [LΣi,j=1p0aij(x,t) ∂xixj% 2+Σi,j=1Nbijxi∂xj-∂t%] with uniformly continuous and bounded aij's.