Topological barriers for locally homeomorphic quasiregular mappings in 3-space

Abstract

We construct a new type of locally homeomorphic quasiregular mappings in the 3-sphere and discuss their relation to the M.A.Lavrentiev problem, the Zorich map with an essential singularity at infinity, the Fatou's problem and a quasiregular analogue of domains of holomorphy in complex analysis. The construction of such mappings comes from our construction of non-trivial compact 4-dimensional cobordisms M with symmetric boundary components and whose interiors have complete 4-dimensional real hyperbolic structures. Such locally homeomorphic quasiregular mappings are defined in the 3-sphere S3 as mappings equivariant with the standard conformal action of uniform hyperbolic 3-lattices in the unit 3-ball and its complement in S3 and with its discrete representation G=() in the group of isometries of H4 . Here G is the fundamental group of our non-trivial hyperbolic 4-cobordism M=(H4(G))/G and the kernel of the homomorphism \!:\! → G is a free group F3 on three generators.