Warped products, solid hyperbolic fillings, and the identity D1,p = N1,p + R

Abstract

We construct a large class of metric measure spaces Z which satisfy the identity D1,p(Z) = N1,p(Z) + R, i.e.\ any measurable function u Z R with an Lp-integrable upper gradient is a constant term away from being Lp-integrable. To do so, we construct a family of hyperbolic fillings Hα, β(Y), α, β ∈ (0, ∞), of a metric measure space Y, via a warped product of Y with an exponentially weighted positive real line. We then show that for certain classes of Y, the above identity is satisfied for Z=Hα,β(Y) when 1 p β/α. We also show that under mild assumptions on Y, the warped product Hα, β(Y) is Gromov hyperbolic as a metric space and the Gromov boundary of Hα, β(Y) is quasisymmetric to Y.