Intrinsic Ultracontractivity for a class of Schroedinger Semigroups in L2(Rn) by Logarithmic Sobolev inequalities

Abstract

In the first part of this article we present a growth condition on the potential q in the Schr\"odinger operator H=- + q(x) in L2( Rn ) that implies Rosen inequalities for the ground state of H, i.e. ∀ > 0 ∃ γ() > 0 \ : \ - ( (x) ) ≤ q(x) + γ(). While these inequalities are not particularly interesting in themselves, they offer Logarithmic Sobolev inequalities which are absolutely essential to prove an intrinsic ultracontractivity of the associated Schr\"odinger semigroup e-tH, i.e. ∀ t>0 ∃ Ct > 0 \ : \ | e-tH u (x) | \ ≤ \ Ct (x) \| u \|2 holds for every u ∈ L2( Rn ) almost everywhere in Rn which we prove in the second part of this article. For proving Rosen inequalities we focus on solving a radial Schr\"odinger inequality and use Agmon's version of the comparison principle and Young's inequality for increasing functions. We follow the classic method proving intrinsic ultracontractivity of e-tH by using weighted Sobolev function spaces, weighted Schr\"odinger semigroups and Logarithmic Sobolev inequalities.