We study the asymptotic behavior of the maximum number of directed cycles of a given length in a tournament: let $c(\ell)$ be the limit of the ratio of the maximum number of cycles of length $\ell$ in an $n$-vertex tournament and the expected number of cycles of length $\ell$ 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 $c(\ell)=1$ if and only if $\ell$ is not divisible by four, which settles a conjecture of Bartley and Day. If $\ell$ is divisible by four, we show that $1+2\cdot\left(2/\pi\right)^{\ell}\le c(\ell)\le 1+\left(2/\pi+o(1)\right)^{\ell}$ and determine the value $c(\ell)$ exactly for $\ell = 8$. We also give a full description of the asymptotic struc...
AbstractAn n-tournament is an orientation of a complete n-partite graph. It was proved by J.A. Bondy...
AbstractThe main results assert that the minimum number of Hamiltonian bypasses in a strong tourname...
Let T be a hamiltonian bipartite tournament with n vertices, γ a hamiltonian directed cycle of T, an...
We study the asymptotic behavior of the maximum number of directed cycles of a given length in a tou...
Linial and Morgenstern conjectured that, among all n-vertex tournaments with cycles of length three...
If T is an n-vertex tournament with a given number of 3-cycles, what can be said about the number of...
We prove that every $n$-vertex tournament has at most $n\left(\frac{n-1}{2}\right)^k$ walks of lengt...
Akin to the Erdős-Rademacher problem, Linial and Morgenstern made the following conjecture in tourna...
The conjecture of Linial and Morgenstern asserts that, among all tournaments with a given density $d...
In 1975, P. Erd\H{o}s proposed the problem of determining the maximum number $f(n)$ of edges in a gr...
AbstractIn a recent paper, Bessy, Sereni and the author (see [3]) have proved that for r≥1, a tourna...
Moser asked for a construction of explicit tournaments on n vertices having at least Hamilton cycles...
For a random tournament on $3^n$ vertices, the expected number of Hamiltonian cycles is known to be ...
Let T be a hamiltonian tournament with n vertices and γ a hamiltonian cycle of T. In previous works ...
AbstractA digraph without loops, multiple arcs and directed cycles of length two is called a local t...
AbstractAn n-tournament is an orientation of a complete n-partite graph. It was proved by J.A. Bondy...
AbstractThe main results assert that the minimum number of Hamiltonian bypasses in a strong tourname...
Let T be a hamiltonian bipartite tournament with n vertices, γ a hamiltonian directed cycle of T, an...
We study the asymptotic behavior of the maximum number of directed cycles of a given length in a tou...
Linial and Morgenstern conjectured that, among all n-vertex tournaments with cycles of length three...
If T is an n-vertex tournament with a given number of 3-cycles, what can be said about the number of...
We prove that every $n$-vertex tournament has at most $n\left(\frac{n-1}{2}\right)^k$ walks of lengt...
Akin to the Erdős-Rademacher problem, Linial and Morgenstern made the following conjecture in tourna...
The conjecture of Linial and Morgenstern asserts that, among all tournaments with a given density $d...
In 1975, P. Erd\H{o}s proposed the problem of determining the maximum number $f(n)$ of edges in a gr...
AbstractIn a recent paper, Bessy, Sereni and the author (see [3]) have proved that for r≥1, a tourna...
Moser asked for a construction of explicit tournaments on n vertices having at least Hamilton cycles...
For a random tournament on $3^n$ vertices, the expected number of Hamiltonian cycles is known to be ...
Let T be a hamiltonian tournament with n vertices and γ a hamiltonian cycle of T. In previous works ...
AbstractA digraph without loops, multiple arcs and directed cycles of length two is called a local t...
AbstractAn n-tournament is an orientation of a complete n-partite graph. It was proved by J.A. Bondy...
AbstractThe main results assert that the minimum number of Hamiltonian bypasses in a strong tourname...
Let T be a hamiltonian bipartite tournament with n vertices, γ a hamiltonian directed cycle of T, an...