Cycle lengths in graphs of given minimum degree

Abstract

We prove that if G is a 2-connected graph with minimum degree at least k≥slant 4, then (1) G contains k cycles whose lengths form an arithmetic progression with common difference one or two, unless G Kk+1 or Kk,n-k; (2) G contains cycles of lengths modulo k for all even , unless G Kk+1 or Kk,n-k; (3) G contains cycles of lengths modulo k for all , unless G Kk+1 or G is bipartite. In addition, we show that if k is even and G is 2-connected with minimum degree at least k-1 and order at least k+2, then G contains cycles of lengths modulo k for all even . As a corollary, we determine the maximum number of edges in a graph that does not contain a cycle of length divisible by k for all odd k.

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