On (1,C4) one-factorization and two orthogonal (2,C4) one-factorization of complete graphs

Abstract

An one-factorization F of the complete graph Kn is (l,Ck), where l≥0 and k≥4 are integers, if the union F G, for any F,G∈F, includes exactly l (edge-disjoint) cycles of length k (lk≤ n). Moreover, a pair of orthogonal one-factorizations F and G of the complete graph Kn is (l,Ck) if the union F G, for any F∈F and G∈G, includes exactly l cycles of length k. In this paper, we prove the following: if q11 (mod 24) is an odd prime power, then there is a (1,C4) one-factorization of Kq+1. Also, there is a pair of orthogonal (2,C4) one-factorization of Kq+1.