Counting even cycles and even paths with bounded circumference
Abstract
For an integer L, write C L for the family of cycles of length at least L. For L=2a let H(n,L)=Ka+ Kn-a, and for L=2a+1 let H(n,L) be obtained from Ka+ Kn-a by adding one edge inside the independent part. We prove sharp results for two even target graphs, namely even cycles C2s and even paths P2r+1. For even cycles, with s3 and L2s, we have \[ ex(n,C2s,C L+1)=C2s(H(n,L)) \] for all sufficiently large n. Together with the known C4 case of Zhu, Győri, He, Lv, Salia and Xiao~[Bull. Lond. Math. Soc. 55 (2023)], this verifies the even-cycle case of their conjecture on ex(n,Ck,C L+1). For even paths, with r2 and L2r, we have \[ ex(n,P2r+1,C L+1)=N(P2r+1,H(n,L)) \] for all sufficiently large n. We also derive the corresponding exact results when the forbidden graph is a path Pp+1, sharpening the relevant even-cycle and even-path asymptotic results of Győri, Salia, Tompkins and Zamora~[Discrete Math. Theor. Comput. Sci. 21 no. 1 (2019)].
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