Stability of L2-invariants on stratified spaces

Abstract

Let M be a compact smoothly stratified pseudo-manifold endowed with a wedge metric g. Let M be a Galois -covering. Under additional assumptions on M, satisfied for example by Witt pseudo-manifolds, we show that the L2-Betti numbers and the Novikov-Shubin invariants are well defined. We then establish their invariance under a smoothly stratified, strongly stratum preserving homotopy equivalence, thus extending results of Dodziuk, Gromov and Shubin to these pseudo-manifolds.

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