Geodesic
Large cliques in sparse random intersection graphs
Mindaugas Bloznelis1 ; Valentas Kurauskas2
1Faculty of Mathematics and Informatics, Vilnius University
2Institute of Mathematics and Informatics, Vilnius University
The electronic journal of combinatorics, Tome 24 (2017) no. 2
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An intersection graph defines an adjacency relation between subsets $S_1,\dots, S_n$ of a finite set $W=\{w_1,\dots, w_m\}$: the subsets $S_i$ and $S_j$ are adjacent if they intersect. Assuming that the subsets are drawn independently at random according to the probability distribution $\mathbb{P}(S_i=A)=P(|A|){\binom{m}{|A|}}^{-1}$, $A\subseteq W$, where $P$ is a probability on $\{0, 1, \dots, m\}$, we obtain the random intersection graph $G=G(n,m,P)$. We establish the asymptotic order of the clique number $\omega(G)$ of a sparse random intersection graph as $n,m\to+\infty$. For $m = \Theta(n)$ we show that the maximum clique is of size $(1-\alpha/2)^{-\alpha/2}n^{1-\alpha/2}(\ln n)^{-\alpha/2}(1+o_P(1))$ in the case where the asymptotic degree distribution of $G$ is a power-law with exponent $\alpha \in (1,2)$. It is of size $\frac {\ln n} {\ln \ln n}(1+o_P(1))$ if the degree distribution has bounded variance, i.e., $\alpha>2$. We construct a simple polynomial-time algorithm which finds a clique of the optimal order $\omega(G) (1-o_P(1))$.
DOI : 10.37236/6233
Classification : 05C80, 05C42, 05C85, 05C69, 68Q17
Mots-clés : clique, random intersection graph, greedy algorithm, complex network, power-law, clustering

Mindaugas Bloznelis  1   ; Valentas Kurauskas  2

1 Faculty of Mathematics and Informatics, Vilnius University
2 Institute of Mathematics and Informatics, Vilnius University 
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Mindaugas Bloznelis; Valentas Kurauskas. Large cliques in sparse random intersection graphs. The electronic journal of combinatorics, Tome 24 (2017) no. 2. doi: 10.37236/6233

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