Intersection Homology. General perversities and topological invariance

Abstract

Topological invariance of the intersection homology of a pseudomanifold without codimension one strata, proven by Goresky and MacPherson, is one of the main features of this homology. This property is true for codimension-dependent perversities with some growth conditions, verifying p(1)= p(2)=0. King reproves this invariance by associating an intrinsic pseudomanifold X* to any pseudomanifold X. His proof consists of an isomorphism between the associated intersection homologies Hp*(X) Hp*( X*) for any perversity p with the same growth conditions verifying p(1)≥ 0. In this work, we prove a certain topological invariance within the framework of strata-dependent perversities, p, which corresponds to the classical topological invariance if p is a GM-perversity. We also extend it to the tame intersection homology, a variation of the intersection homology, particularly suited for ``large'' perversities, if there is no singular strata on X becoming regular in X*. In particular, under the above conditions, the intersection homology and the tame intersection homology are invariant under a refinement of the stratification.