Threshold functions for small subgraphs in simple graphs and multigraphs
Abstract
We revisit the problem of counting the number of copies of a fixed graph in a random graph or multigraph, for various models of random (multi)graphs. For our proofs we introduce the notion of \emph{patchworks} to describe the possible overlappings of copies of subgraphs. Furthermore, the proofs are based on analytic combinatorics to carry out asymptotic computations. The flexibility of our approach allows us to tackle a wide range of problems. We obtain the asymptotic number and the limiting distribution of the number of subgraphs which are isomorphic to a graph from a given set of graphs. The results apply to multigraphs as well as to (multi)graphs with degree constraints. One application is to scale-free multigraphs, where the degree distribution follows a power law, for which we show how to obtain the asymptotic number of copies of a given subgraph and give as an illustration the expected number of small cycles.
Cite
@article{arxiv.1807.05772,
title = {Threshold functions for small subgraphs in simple graphs and multigraphs},
author = {Gwendal Collet and Élie de Panafieu and Danièle Gardy and Bernhard Gittenberger and Vlady Ravelomanana},
journal= {arXiv preprint arXiv:1807.05772},
year = {2018}
}
Comments
42 pages, 5 figures