Cycle lengths modulo k in large 3-connected cubic graphs
Abstract
We prove that for all natural numbers m and k where k is odd, there exists a natural number N(k) such that any 3-connected cubic graph with at least N(k) vertices contains a cycle of length m modulo k. We also construct a family of graphs showing that this is not true for 2-connected cubic graphs if m and k are divisible by 3 and k≥ 12.
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