On 5-cycles and strong 5-subtournaments in a tournament of odd order n

Abstract

Let T be a tournament of odd order n 5, cm(T) be the number of its m-cycles, and sm(T) be the number of its strongly connected m-subtournaments. Due to work of L.W. Beineke and F. Harary, it is well known that sm(T) sm(RLTn), where RLTn is the regular locally transitive tournament of order n. For m=3 and m=4, cm(T) equals sm(T), but it is not so for m 5. As J.W. Moon pointed out in his note in 1966, the problem of determining the maximum of cm(T) seems very difficult in general (i.e. for m 5). In the present paper, based on the Komarov-Mackey formula for c5(T) obtained recently, we prove that c5(T) (n+1)n(n-1)(n-2)(n-3)/160 with equality holding iff T is doubly regular. A formula for s5(T) is also deduced. With the use of it, we show that s5(T) (n+1)n(n-1)(n-3)(11n-47)/1920 with equality holding iff T=RLTn or n=7 and T is regular or n=5 and T is strong. It is also proved that for a regular tournament T of (odd) order n 9, a lower bound (n+1)n(n-1)(n-3)(17n-59)/3840 s5(T) holds with equality iff T is doubly regular. These results are compared with the ones recently obtained by the author for c5(T).