Kernel estimates for elliptic operators with unbounded diffusion, drift and potential terms

Abstract

In this paper we prove that the heat kernel k associated to the operator A:= (1+|x|α) +b|x|α-1x|x|·∇ -|x|β satisfies k(t,x,y) ≤ c1eλ0 t+ c2t-γ(1+|y|α1+|x|α)b2α (|x||y|)-N-12-14(β-α)1+|y|α e-2β-α+2(|x|β-α+22+ |y|β-α+22) for t>0,\,|x|,\,|y| 1, where b∈R, c1,\,c2 are positive constants, λ0 is the largest eigenvalue of the operator A, and γ=β-α+2β+α-2, in the case where N>2,\,α>2 and β>α -2. The proof is based on the relationship between the log-Sobolev inequality and the ultracontractivity of a suitable semigroup in a weighted space.