Whitney functions determine the real homotopy type of a semi-analytic set

Abstract

In this paper, we investigate the Whitney--de Rham complex W (X) associated to a semi-analytic subset X of an analytic manifold M. This complex is a commutative differential graded algebra, that is defined to be the quotient of the de Rham complex of smooth differential forms on M by the differential graded ideal generated by all smooth functions which are flat on X. We use Hironaka's desingularization theorem to prove a Poincar\'e Lemma for W (X) holds true, which entails that its cohomology is isomorphic to the real cohomology of X. Furthermore, we show that this isomorphism is induced by a quasi-isomorphism of differential graded algebras. Thus it preserves the product structure, and is therefore an isomorphism of commutative differential graded algebras. As a consequence we show, when X is simply connected, that the Whitney--de Rham complex determines the real homotopy type of X. This allows one further to conclude that the Hochschild homology of the differential graded algebra W (X) is isomorphic to the cohomology of the free loop space L X.