Discrete group actions on 3-manifolds and embeddable Cayley complexes
Abstract
We prove that a group admits a discrete topological (equivalently, smooth) action on some simply-connected 3-manifold if and only if has a Cayley complex embeddable -- with certain natural restrictions -- in one of the following four 3-manifolds: (i) S3, (ii) R3, (iii) S2 × R, (iv) the complement of a tame Cantor set in S3.
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