Large Cliques in Sparse Random Intersection Graphs

Given positive integers n and m, and a probability measure P on {0, 1, ..., m} the random intersection graph G(n,m,P) on vertex set V = {1,2, ..., n} and with attribute set W = {w_1, w_2, ..., w_m} is defined as follows. Let S_1, S_2, ..., S_n be independent random subsets of W such that for any v \in V and any S \subseteq W we have \pr(S_v = S) = P(|S|) / \binom (m, |S|). The edge set of G(n,m,P) consists of those pairs {u,v} V for which S_u and S_v intersect. We study the asymptotic order of the clique number \omega(G(n,m,P)) in random intersection graphs with bounded expected degrees. For instance, in the case m = \Theta(n) we show that if the vertex degree distribution is power-law with exponent \alpha \in (1;2), then the maximum clique is of a polynomial size, while if the variance of the degrees is bounded, then the maximum clique has (ln n)/(ln ln n) (1 + o_P(1)) vertices whp. In each case there is a polynomial algorithm which finds a clique of size \omega(G(n,m,P)) (1-o_P(1)).

[1]  C. McDiarmid Concentration , 1862, The Dental register.

[2]  Ilkka Norros,et al.  Large Cliques in a Power-Law Random Graph , 2009, Journal of Applied Probability.

[3]  E. Seneta,et al.  Regularly varying sequences , 1973 .

[4]  Duncan J. Watts,et al.  Collective dynamics of ‘small-world’ networks , 1998, Nature.

[5]  E. Chong,et al.  Wiley‐Interscience Series in Discrete Mathematics and Optimization , 2011 .

[6]  Valentas Kurauskas,et al.  On local weak limit and subgraph counts for sparse random graphs , 2015, Journal of Applied Probability.

[7]  Stanley Wasserman,et al.  Social Network Analysis: Methods and Applications , 1994, Structural analysis in the social sciences.

[8]  Katarzyna Rybarczyk,et al.  Poisson Approximation of the Number of Cliques in Random Intersection Graphs , 2010, Journal of Applied Probability.

[9]  T. Vicsek,et al.  Uncovering the overlapping community structure of complex networks in nature and society , 2005, Nature.

[10]  Maurizio Vichi,et al.  Studies in Classification Data Analysis and knowledge Organization , 2011 .

[11]  József Balogh,et al.  Erdős–Ko–Rado in Random Hypergraphs , 2009, Combinatorics, Probability and Computing.

[12]  Alan M. Frieze,et al.  Random graphs , 2006, SODA '06.

[13]  Edward R. Scheinerman,et al.  On Random Intersection Graphs: The Subgraph Problem , 1999, Combinatorics, Probability and Computing.

[14]  Erhard Godehardt,et al.  Two Models of Random Intersection Graphs for Classification , 2003 .

[15]  Valentas Kurauskas,et al.  Assortativity and clustering of sparse random intersection graphs , 2012, 1209.4675.

[16]  Paul G. Spirakis,et al.  Maximum Cliques in Graphs with Small Intersection Number and Random Intersection Graphs , 2012, MFCS.

[17]  Valentas Kurauskas,et al.  Large cliques in sparse random intersection graphs (extended version) , 2013 .

[18]  Igor Carboni Oliveira,et al.  Erdős-Ko-Rado for Random Hypergraphs: Asymptotics and Stability , 2017, Comb. Probab. Comput..

[19]  Ginestra Bianconi,et al.  Emergence of large cliques in random scale-free networks , 2006 .

[20]  W. T. Gowers,et al.  RANDOM GRAPHS (Wiley Interscience Series in Discrete Mathematics and Optimization) , 2001 .

[21]  Valentas Kurauskas ON TWO MODELS OF RANDOM GRAPHS , 2013 .

[22]  Mindaugas Bloznelis Degree distribution of a typical vertex in a general random intersection graph , 2008 .

[23]  Willemien Kets,et al.  RANDOM INTERSECTION GRAPHS WITH TUNABLE DEGREE DISTRIBUTION AND CLUSTERING , 2009, Probability in the Engineering and Informational Sciences.

[24]  Anusch Taraz,et al.  Coloring Random Intersection Graphs and Complex Networks , 2008, SIAM J. Discret. Math..

[25]  Mindaugas Bloznelis,et al.  Degree and clustering coefficient in sparse random intersection graphs , 2013, 1303.3388.

[26]  Albert-László Barabási,et al.  Statistical mechanics of complex networks , 2001, ArXiv.