Estimates of Green and Martin kernels for Schr\"odinger operators with singular potential in Lipschitz domains

Abstract

Consider operators of the form Lγ V:= +γ V in a bounded Lipschitz domain ⊂ RN. Assume that V∈ C1() satisfies |V(x)| ≤ a \,distance\,(x,∂)-2 for every x∈ and γ is a number in a range (γ-,γ+) described in the introduction. The model case is V(x)= distance\,(x,F)-2 where F is a closed subset of ∂ and γ< cH(V)= Hardy constant for V. We provide sharp two sided estimates of the Green and Martin kernel for Lγ V in . In addition we establish a pointwise version of the 3G inequality.