A limit theorem for small cliques in inhomogeneous random graphs

Abstract

The theory of graphons comes with a natural sampling procedure, which results in an inhomogeneous variant of the Erdos--R\'enyi random graph, called W-random graphs. We prove, via the method of moments, a limit theorem for the number of r-cliques in such random graphs. We show that, whereas in the case of dense Erdos--R\'enyi random graphs the fluctuations are normal of order nr-1, the fluctuations in the setting of W-random graphs may be of order 0, nr-1, or nr-0.5. Furthermore, when the fluctuations are of order nr-0.5 they are normal, while when the fluctuations are of order nr-1 they exhibit either normal or a particular type of chi-square behavior whose parameters relate to spectral properties of W. These results can also be deduced from a general setting [Janson and Nowicki, PTRF 1991], based on the projection method. In addition to providing alternative proofs, our approach makes direct links to the theory of graphons.