$L^1$ cohomology of bounded subanalytic manifolds

Abstract: We prove some de Rham theorems on bounded subanalytic submanifolds of $\R^n$ (not necessarily compact). We show that the $L^1$ cohomology of such a submanifold is isomorphic to its singular homology. In the case where the closure of the underlying manifold has only isolated singularities this implies that the $L^1$ cohomology is Poincar\'e dual to $L^\infty$ cohomology (in dimension $j <m-1$). In general, Poincar\'e duality is related to the so-called $L^1$ Stokes' Property. For oriented manifolds, we show that the $L^1$ Stokes' property holds if and only if integration realizes a nondegenerate pairing between $L^1$ and $L^\infty$ forms. This is the counterpart of a theorem proved by Cheeger on $L^2$ forms.