KFP operators with coefficients measurable in time and Dini continuous in space

Abstract

We consider degenerate KFP operators \[ Lu=Σi,j=1m0aij(x,t)∂xixj2u+Σk,j=1Nbjkxk∂xju-∂tuΣi,j=1m0aij(x,t)∂xixj2u+Yu \] ((x,t)∈RN+1, 1≤ m0≤ N) s.t. the model operator having constant aij is hypoelliptic, translation invariant w.r.t. a Lie group in RN+1 and 2-homogeneous w.r.t. a family of dilations; (aij)i,j=1m0 is symmetric and uniformly positive on Rm0; aij are bounded and Dini continuous in space, bounded measurable in time, i.e.: setting \[ ST=RN×( -∞,T) , \] \[ ωf,ST(r)=(x,t),(y,t)∈ ST\\ x-y≤ r|f(x,t)-f(y,t)| \] \[ fD(ST)=∫01ωf,ST(r)% rdr+ fL∞( ST) \] we ask aijD(ST)<∞. We bound ωuxixj,ST, uxixj L∞(ST) (i,j=1,2,...,m0), ωYu,ST, YuL∞(ST) in terms of ωLu,ST, LuL∞(ST) and uL∞( ST) , getting a control on the uniform continuity in space of uxixj,Yu if Lu is bounded and Dini-continuous in space. Under the additional assumption that aij and Lu are log-Dini continuous, meaning the finiteness of the quantity% \[ ∫01ωf,ST( r) r r dr, \] we prove that uxixj and Yu are Dini continuous; moreover, in this case, the derivatives uxixj are locally uniformly continuous in space and time.