Cycles of length three and four in tournaments
Abstract
Linial and Morgenstern conjectured that, among all n-vertex tournaments with dn3 cycles of length three, the number of cycles of length four is asymptotically minimized by a random blow-up of a transitive tournament with all but one part of equal size and one smaller part. We prove the conjecture for d 1/36 by analyzing the possible spectrum of adjacency matrices of tournaments. We also demonstrate that the family of extremal examples is broader than expected and give its full description for d 1/16.
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