Derivative Formula and Gradient Estimates for Gruschin Type Semigroups

Abstract

By solving a control problem and using Malliavin calculus, explicit derivative formula is derived for the semigroup Pt generated by the Gruschin type operator on m× d: L (x,y)= 1 2 \Σi=1m xi2 +Σj,k=1d ((x)(x)*)jk yjyk\,\ \ (x,y)∈ m×d, where ∈ C1(m; dd) might be degenerate. In particular, if (x) is comparable with |x|lId× d for some l 1 in the sense of (A4), then for any p>1 there exists a constant Cp>0 such that | Pt f(x,y)| Cp (Pt |f|p)1/pt t(|x|2+t)l,\ \ t>0, f∈ b(m+d), (x,y)∈ m+d, which implies a new Harnack type inequality for the semigroup. A more general model is also investigated.