Decay estimates for Schr\"odinger heat semigroup with inverse square potential in Lorentz spaces II

Abstract

Let H:=-+V be a nonnegative Schr\"odinger operator on L2( RN), where N 2 and V is a radially symmetric inverse square potential. Let \|∇α e-tH\|(Lp,σ Lq,θ) be the operator norm of ∇α e-tH from the Lorentz space Lp,σ( RN) to Lq,θ( RN), where α∈\0,1,2,…\. We establish both of upper and lower decay estimates of \|∇α e-tH\|(Lp,σ Lq,θ) and study sharp decay estimates of \|∇α e-tH\|(Lp,σ Lq,θ). Furthermore, we characterize the Laplace operator - from the view point of the decay of \|∇α e-tH\|(Lp,σ Lq,θ).