An infinite-dimensional phenomenon in finite-dimensional metric topology
Abstract
We show that there are homotopy equivalences h:N M between closed manifolds which are induced by cell-like maps p:N X and q:M X but which are not homotopic to homeomorphisms. The phenomenon is based on construction of cell-like maps that kill certain L-classes. The image space in these constructions is necessarily infinite-dimensional. In dimension >6 we classify all such homotopy equivalences. As an application, we show that such homotopy equivalences are realized by deformations of Riemannian manifolds in Gromov-Hausdorff space preserving a contractibility function.
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