On the number of solutions in random graph $k$-colouring
Let $k \ge 3$ be a fixed integer. We exactly determine the asymptotic distribution of $\ln Z_k(G(n,m))$, where $Z_k(G(n,m))$ is the number of $k$-colourings of the random graph $G(n,m)$. A crucial observation to this aim is that the fluctuations in the number of colourings can be attributed to the f...
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| Zusammenfassung: | Let $k \ge 3$ be a fixed integer. We exactly determine the asymptotic
distribution of $\ln Z_k(G(n,m))$, where $Z_k(G(n,m))$ is the number of
$k$-colourings of the random graph $G(n,m)$. A crucial observation to this aim
is that the fluctuations in the number of colourings can be attributed to the
fluctuations in the number of small cycles in $G(n,m)$. Our result holds for a
wide range of average degrees, and for $k$ exceeding a certain constant $k_0$
it covers all average degrees up to the so-called "condensation phase
transition". |
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| DOI: | 10.48550/arxiv.1609.04191 |