Poincar\'e duality for Lp cohomology on subanalytic singular spaces

Abstract

We investigate the problem of Poincar\'e duality for Lp differential forms on bounded subanalytic submanifolds of Rn (not necessarily compact). We show that, when p is sufficiently close to 1 then the Lp cohomology of such a submanifold is isomorphic to its singular homology. In the case where p is large, we show that Lp cohomology is dual to intersection homology. As a consequence, we can deduce that the Lp cohomology is Poincar\'e dual to Lq cohomology, if p and q are H\"older conjugate to each other and p is sufficiently large.