On the size of graphs without repeated cycle lengths
Abstract
In 1975, P. Erd\"os proposed the problem of determining the maximum number f(n) of edges in a graph of n vertices in which any two cycles are of different lengths. In this paper, it is proved that f(n)≥ n+1073t+73 for t=1260r+169 \,\ (r≥ 1) and n ≥ 21194t2+87978t+159574. Consequently, ∈fn ∞ f(n)-n n ≥ 2 + 765419071, which is better than the previous bounds 2 [Y. Shi, Discrete Math. 71(1988), 57-71], 2.4 [C. Lai, Australas. J. Combin. 27(2003), 101-105]. The conjecture n → ∞ f(n)-n n= 2.4 is not true.
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