The homology of abelian coverings of knotted graphs
Abstract
Let N be a regular branched cover of a homology 3-sphere M with deck group G isomorphic to Z2d and branch set a trivalent graph Gamma; such a cover is determined by a coloring of the edges of Gamma with elements of G. For each index-2 subgroup H of G, MH = N/H is a double branched cover of M. Sakuma has proved that the first homology of N is isomorphic, modulo 2-torsion, to the direct sum of the first homology groups of the MH, and has shown that H1(N) is determined up to isomorphism by the direct sum of the H1(MH) in certain cases; specifically, when d=2 and the coloring is such that the branch set of each cover MH -> M is connected, and when d=3 and Gamma is the complete graph K4. We prove this for a larger class of coverings: when d=2, for any coloring of a connected graph; when d=3 or 4, for an infinite class of colored graphs; and when d=5, for a single coloring of the Petersen graph.
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