The Two Weight Inequality for Poisson Semigroup on Manifold with Ends

Abstract

Let M = Rm Rn be a non-doubling manifold with two ends Rm Rn, m > n 3. Let be the Laplace--Beltrami operator which is non-negative self-adjoint on L2(M). Then and its square root generate the semigroups e-t and e-t on L2(M), respectively. We give testing conditions for the two weight inequality for the Poisson semigroup e-t to hold in this setting. In particular, we prove that for a measure μ on M+:=M× (0,∞) and σ on M: \|Pσ(f)\|L2(M+;μ) \|f\|L2(M;σ), with Pσ(f)(x,t):= ∫M Pt(x,y)f(y) \,dσ(y) if and only if testing conditions hold for the Poisson semigroup and its adjoint. Further, the norm of the operator is shown to be equivalent to the best constant in these testing conditions.