Sonja Lj. Cukic, Dmitry N. Kozlov
Published 2004-10-14, updated 2005-01-31Version 2
The main result of this paper is a proof of the following conjecture of Babson & Kozlov: Theorem. Let G be a graph of maximal valency d, then the complex Hom(G,K_n) is at least (n-d-2)-connected. Here Hom(-,-) denotes the polyhedral complex introduced by Lov\'asz to study the topological lower bounds for chromatic numbers of graphs. We will also prove, as a corollary to the main theorem, that the complex Hom(C_{2r+1},K_n) is (n-4)-connected, for $n\geq 3$.
Comments: 16 pages, 6 figures
Journal: IMRN 2005:25 (2005) 1543-1562.
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