Geodesic
Diameter and stationary distribution of random \(r\)-out digraphs
The electronic journal of combinatorics, Tome 27 (2020) no. 3
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Let $D(n,r)$ be a random $r$-out regular directed multigraph on the set of vertices $\{1,\ldots,n\}$. In this work, we establish that for every $r \ge 2$, there exists $\eta_r>0$ such that $\mathrm{diam}(D(n,r))=(1+\eta_r+o(1))\log_r{n}$. The constant $\eta_r$ is related to branching processes and also appears in other models of random undirected graphs. Our techniques also allow us to bound some extremal quantities related to the stationary distribution of a simple random walk on $D(n,r)$. In particular, we determine the asymptotic behaviour of $\pi_{\max}$ and $\pi_{\min}$, the maximum and the minimum values of the stationary distribution. We show that with high probability $\pi_{\max} = n^{-1+o(1)}$ and $\pi_{\min}=n^{-(1+\eta_r)+o(1)}$. Our proof shows that the vertices with $\pi(v)$ near to $\pi_{\min}$ lie at the top of "narrow, slippery tower"; such vertices are also responsible for increasing the diameter from $(1+o(1))\log_r n$ to $(1+\eta_r+o(1))\log_r{n}$.
DOI : 10.37236/9485
Classification : 05C80, 05C81, 05C20, 05C12
Mots-clés : random undirected graphs, branching processes 
@article{10_37236_9485,
     author = {Louigi Addario-Berry and Borja Balle and Guillem Perarnau},
     title = {Diameter and stationary distribution of random \(r\)-out digraphs},
     journal = {The electronic journal of combinatorics},
     year = {2020},
     volume = {27},
     number = {3},
     doi = {10.37236/9485},
     zbl = {1445.05093},
     url = {http://geodesic.mathdoc.fr/articles/10.37236/9485/}
}
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Louigi Addario-Berry; Borja Balle; Guillem Perarnau. Diameter and stationary distribution of random \(r\)-out digraphs. The electronic journal of combinatorics, Tome 27 (2020) no. 3. doi: 10.37236/9485

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