About subdivisions of four blocks cycles C(k1,1,k3,1) in digraphs with large chromatic number

Abstract

A cycle with four blocks C(k1, k2,k3,k4) is an oriented cycle formed of four blocks of lengths k1, k2, k3 and k4 respectively. Recently, Cohen et al. conjectured that for every positive integers k1, k2, k3, k4, there is an integer g(k1,k2,k3,k4) such that every strongly connected digraph D containing no subdivisions of C(k1,k2,k3,k4) has a chromatic number at most g(k1,k2,k3,k4). This conjecture is confirmed by Cohen et al. for the case of C(1,1,1,1) and by Al-Mniny for the case of C(k1,1,1,1). In this paper, we affirm Cohen et al.'s conjecture for the case where k2=k4=1, namely g(k1,1,k3,1) =O((k1+k3)2). Moreover, we show that if in addition D is Hamiltonian, then the chromatic number of D is at most 6k, with k=max\k1,k3\.