Degrees of maps and multiscale geometry

Abstract

We study the degree of an L-Lipschitz map between Riemannian manifolds, proving new upper bounds and constructing new examples. For instance, if Xk is the connected sum of k copies of CP2 for k 4, then we prove that the maximum degree of an L-Lipschitz self-map of Xk is between C1 L4 ( L)-4 and C2 L4 ( L)-1/2. More generally, we divide simply connected manifolds into three topological types with three different behaviors. Each type is defined by purely topological criteria. For scalable simply connected n-manifolds, the maximal degree is Ln. For formal but non-scalable simply connected n-manifolds, the maximal degree grows roughly like Ln ( L)θ(1). And for non-formal simply connected n-manifolds, the maximal degree is bounded by Lα for some α < n.

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