On Schroedinger type operators with unbounded coefficients: Generation and heat kernel estimates

Abstract

We consider the Schr\"odinger type operator A=(1+|x|α)-|x|β, for α∈ [0,2] and β 0. We prove that, for any p∈ (1,∞), the minimal realization of operator A in Lp(N) generates a strongly continuous analytic semigroup (Tp(t))t 0. For α∈ [0,2) and β 2, we then prove some upper estimates for the heat kernel k associated to the semigroup (Tp(t))t 0. As a consequence we obtain an estimate for large |x| of the eigenfunctions of A. Finally, we extend such estimates to a class of divergence type elliptic operators.