Quasiregular cobordism theorem

Abstract

In this article we prove that, for an oriented PL n-manifold M with m boundary components and d0∈ N, there exist mutually disjoint closed Euclidean balls and a K-quasiregular mapping M Sn int(B1 ·s Bm) of degree at least d0. The result is quantitative in the sense that the distortion K of the mapping does not depend on the degree. As applications of this construction, we obtain Rickman's large local index theorem for quasiregular maps to all dimensions n 4. We also construct, in dimension n=4, a version of a wildly branching quasiregular map of Heinonen and Rickman, and a uniformly quasiregular map of arbitrarily large degree whose Julia set is a wild Cantor set. The existence of a wildly branching quasiregular map yields an example of a metric 4-sphere ( S4,d), which is not bilipschitz equivalent to the Euclidean 4-sphere S4 but which admits a BLD-map to S4. For the proof of the main theorem, we develop a dimension-free deformation method for cubical Alexander maps. For cubical and shellable Alexander maps this completes the 2-dimensional deformation theory originated by S.~Rickman in 1985.