General perversities and L2 de Rham and Hodge theorems for stratified pseudomanifolds

Abstract

Given a compact stratified pseudomanifold with a Thom-Mather stratification and a class of riemannian metrics over its regular part, we study the relationships between the L2 de Rham and Hodge cohomology and the intersection cohomology of X associated to some perversities. More precisely, to a kind of metric which we call quasi edge with weights, we associate two general perversities in the sense of G. Friedman, pg and its dual qg. We then show that the absolute L2 Hodge cohomology is isomorphic to the maximal L2 de Rham cohomology and this is in turn isomorphic to the intersection cohomology associated to the perversity qg. Moreover we prove that the relative L2 Hodge cohomology is isomorphic to the minimal L2 de Rham cohomology and this is in turn isomorphic to the intersection cohomology associated to the perversity pg.