Solution on strong partition of 2-balanced regular multipartite tournaments

Abstract

We call a partition of a c-partite tournament into tournaments of order c is strong if each tournament is strongly connected. The strong partition number denoted as ST(r), represents the minimum integer c' such that every regular r-balanced c-partite tournament has a strong partition with c≥ c'. Figueroa, Montellano-Ballesteros and Olsen showed the existence of ST(r) for all r≥ 2 and proved that 5≤ ST(2)≤ 7. In this note, we establish that ST(2)=6 and we also show the unique 2-balanced 5-partite tournament which has no strong partition.