Moon-type theorems on circuits in strongly connected tournaments of order N and diameter D
Abstract
Let T be a strongly connected tournament of order n 4 whose diameter does not exceed d 3. Denote by c(T) the number of circuits of length in T. In our recent paper, we construct a strongly connected tournament Td,n of order n with diameter d and conjecture that c(T) c(Td,n) for any =3,...,n. In particular, for d=n-1, this inequality is true and yields the known Moon (lower) bound c(T) n-+1. Moreover, we suggest that if n+3 2d, then for any given taken in the range n-d+3,...,d, the equality c(T)=c(Td,n) implies that T is isomorphic to Td,n or its converse Td,n-. For d=n-1, the corresponding particular statement is nothing else than Las Vergnas' theorem. Recently, we have confirmed the posed conjecture for the case d=n-2. In the present paper, we show that it is also true for d=n-3.
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