Fundamental groups of neighborhood complexes

Abstract

The neighborhood complexes of graphs were introduced by Lov\'asz in his proof of the Kneser conjecture. He showed that a certain topological property of N(G) gives a lower bound for the chromatic number of G. In this paper, we study a combinatorial description of the fundamental groups of the neighborhood complexes. For a positive integer r, we introduce the r-fundamental group π1r(G,v) of a based graph (G,v) and the r-neighborhood complex Nr(G) of G. The 1-neighborhood complex is the neighborhood complex. We show that the even part π12r(G,v)ev, which is a subgroup of π12r(G,v) with index 1 or 2, is isomorphic to the fundamental group of (Nr(G),v) if v is not isolated. We can use the r-fundamental groups to show the non-existence of graph homomorphisms. For example, we show that π13(KG2k+1,k) is isomorphic to Z /2, and this implies that there is no graph homomorphism from KG2k+1,k to the 5-cycle graph C5. We discuss the covering maps associated to r-fundamental groups.