Intrinsic Ultracontractivity for a class of Schroedinger Semigroups in L2( Rn ) using Log-Sobolev-inequalities and duality arguments

Abstract

We present a class of potentials q Rn (0,∞) that implies the weighted Schr\"odinger semigroup -1e-tH to map a weighted Lebesgue function space Lμ1(Rn) into a weighted Lebesgue function space Lμ2(Rn) continously at every time t>0 by Logarithmic Sobolev inequalities for H=- + q(x) with it's strictly positive ground state Rn (0,∞). We use the self-adjointness of e-tH in L2(Rn) to infer an intrinsic ultracontractivity, i.e. ∀ t>0 \ ∃ Ct > 0 \ : \ | e-tH u (x) | \ ≤ \ Ct (x) \| u \|2 for every u ∈ L2( Rn ) almost everywhere in Rn.