Cycles in Color-Critical Graphs

Abstract

Tuza [1992] proved that a graph with no cycles of length congruent to 1 modulo k is k-colorable. We prove that if a graph G has an edge e such that G-e is k-colorable and G is not, then for 2≤ r≤ k, the edge e lies in at least Πi=1r-1(k-i) cycles of length 1 r in G, and G-e contains at least 12Πi=1r-1(k-i) cycles of length 0 r. A (k,d)-coloring of G is a homomorphism from G to the graph Kk:d with vertex set Zk defined by making i and j adjacent if d≤ j-i ≤ k-d. When k and d are relatively prime, define s by sd 1 k. A result of Zhu [2002] implies that G is (k,d)-colorable when G has no cycle C with length congruent to is modulo k for any i∈ \1,…,2d-1\. In fact, only d classes need be excluded: we prove that if G-e is (k,d)-colorable and G is not, then e lies in at least one cycle with length congruent to is k for some i in \1,…,d\. Furthermore, if this does not occur with i∈\1,…,d-1\, then e lies in at least two cycles with length 1 k and G-e contains a cycle of length 0 k.