Coloring spheres in 3--manifolds

Abstract

The sphere graph of Mr, a connect sum of r copies of S1× S2 was introduced by Hatcher as an analog of the curve graph of a surface to study the outer automorphism group of a free group Fr. Bestvina, Bromberg, and Fujiwara proved that the chromatic number of the curve graph is finite; bounds were subsequently improved by Gaster, Greene, and Vlamis. Motivated by the analogy, we provide upper and lower bounds for the chromatic number of the sphere graph of Mr. As a corollary to the prime decomposition of 3-manifolds, this gives bounds on the chromatic number of the sphere graph for any orientable 3-manifold.

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