Two-sided heat kernel estimates for Schr\"odinger operators with unbounded potentials

Abstract

Consider the Schr\"odinger operator LV=-+V on d, where V:d [0,∞) is a nonnegative and locally bounded potential on d so that for all x∈ d with |x| 1, c1g(|x|) V(x) c2g(|x|) with some constants c1,c2>0 and a nondecreasing and strictly positive function g:[0,∞) [1,+∞) that satisfies g(2r) c0 g(r) for all r>0 and r ∞ g(r)=∞. We establish global in time and qualitatively sharp bounds for the heat kernel of the associated Schr\"odinger semigroup by the probabilistic method. In particular, we can present global in space and time two-sided bounds of heat kernel even when the Schr\"odinger semigroup is not intrinsically ultracontractive. Furthermore, two-sided estimates for the corresponding Green's functions are also obtained.