On graphs without cycles of length 1 modulo 3
Abstract
Burr and Erdos conjectured in 1976 that for every two integers k>≥slant 0 satisfying that kZ+ contains an even integer, an n-vertex graph containing no cycles of length modulo k can contain at most a linear number of edges on n. Bollob\'as confirmed this conjecture in 1977 and then Erdos proposed the problem of determining the exact value of the maximum number of edges in such a graph. For the above k and , define c,k to be the least constant such that every n-vertex graph with at least c,k· n edges contains a cycle of length modulo k. The precise (or asymptotic) values of c,k are known for very few pairs and k. In this paper, we precisely determine the maximum number of edges in a graph containing no cycles of length 1 modulo 3. In particular, we show that every n-vertex graph with at least 53(n-1) edges contains a cycle of length 1 modulo 3, unless 9|(n-1) and each block of the graph is a Petersen graph. As a corollary, we obtain that c1,3=53. This is the last remaining class modulo k for 1≤slant k≤slant 4.
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