Global Sobolev theory for Kolmogorov-Fokker-Planck operators with coefficients measurable in time and VMO in space

Abstract

We consider Kolmogorov-Fokker-Planck operators of the form Lu=Σi,j=1qaij(x,t)uxixj+Σk,j=1N bjkxkuxj-∂tu, with ( x,t) ∈RN+1,N≥ q≥1. We assume that aij∈ L∞( RN+1) , the matrix \ aij\ is symmetric and uniformly positive on Rq, and the drift \[ Y=Σk,j=1Nbjkxk∂xj-∂t \] has a structure which makes the model operator with constant aij hypoelliptic, translation invariant w.r.t. a suitable Lie group operation, and 2-homogeneus w.r.t. a suitable family of dilations. We also assume that the coefficients aij are VMO w.r.t. the space variable, and only bounded measurable in t. We prove, for every p∈( 1,∞) , global Sobolev estimates of the kind: align* u WX2,p(ST) & Σi,j=1q uxixjLp(ST) + Yu Lp(ST) +Σi=1q uxi Lp(ST) + u Lp(ST) \\ & ≤ c\ Lu Lp(ST)+ uLp(ST)\ align* with ST=RN×( -∞,T) for any T∈(-∞,+∞]. Also, the well-posedness in WX2,p(T), with T=RN×(0,T) and T∈R, of the Cauchy problem% cases Lu=f & in T \\ u(·,0) =g & in RN cases is proved, for f∈ Lp(T), g∈ WX2,p(RN).

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