Cycles of a given length in tournaments

Abstract

We study the asymptotic behavior of the maximum number of directed cycles of a given length in a tournament: let c() be the limit of the ratio of the maximum number of cycles of length in an n-vertex tournament and the expected number of cycles of length in the random n-vertex tournament, when n tends to infinity. It is well-known that c(3)=1 and c(4)=4/3. We show that c()=1 if and only if is not divisible by four, which settles a conjecture of Bartley and Day. If is divisible by four, we show that 1+2·(2/π) c() 1+(2/π+o(1)) and determine the value c() exactly for = 8. We also give a full description of the asymptotic structure of tournaments with the maximum number of cycles of length when is not divisible by four or ∈\4,8\.