Pancyclicity when each cycle contains k chords

Abstract

For integers n ≥ k ≥ 2, let c(n,k) be the minimum number of chords that must be added to a cycle of length n so that the resulting graph has the property that for every l ∈ \ k , k + 1 , … , n \, there is a cycle of length l that contains exactly k of the added chords. Affif Chaouche, Rutherford, and Whitty introduced the function c(n,k). They showed that for every integer k ≥ 2, c(n , k ) ≥ k ( n1/k ) and they asked if n1/k gives the correct order of magnitude of c(n, k) for k ≥ 2. Our main theorem answers this question as we prove that for every integer k ≥ 2, and for sufficiently large n, c(n , k) ≤ k n1/k + k2. This upper bound, together with the lower bound of Affif Chaouche et.\ al., shows that the order of magnitude of c(n,k) is n1/k.