Topological Symmetry Groups of Graphs in 3-Manifolds
Abstract
We prove that for every closed, connected, orientable, irreducible 3-manifold, there exists an alternating group An which is not the topological symmetry group of any graph embedded in the manifold. We also show that for every finite group G, there is an embedding of some graph in a hyperbolic rational homology 3-sphere such that the topological symmetry group of is isomorphic to G.
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