L2-cohomology and quasi-isometries on the ends of unbounded geometry

Abstract

In this paper we study the minimal and maximal L2-cohomology of oriented, possibly not complete, Riemannian manifolds. Our focus will be on both the reduced and the unreduced L2-cohomology groups. In particular we will prove that these groups are invariant under uniform homotopy equivalence quasi-isometric on the unbounded ends. A uniform map is a uniformly continuous map such that the diameter of the preimage of a subset is bounded in terms of the diameter of the subset itself. A map f between two Riemannian manifolds (X,g) and (Y,h) is quasi-isometric on the unbounded ends if X = M EX where M is the interior of a manifold of bounded geometry with boundary, EX is an open of X and the restriction of f to EX is a quasi-isometry. Finally some consequences are shown: the main ones are definition of a mapping cone for L2-cohomology and the invariance of the L2-signature.

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