English

Finding and testing network communities by lumped Markov chains

Physics and Society 2011-11-07 v1 Social and Information Networks

Abstract

Identifying communities (or clusters), namely groups of nodes with comparatively strong internal connectivity, is a fundamental task for deeply understanding the structure and function of a network. Yet, there is a lack of formal criteria for defining communities and for testing their significance. We propose a sharp definition which is based on a significance threshold. By means of a lumped Markov chain model of a random walker, a quality measure called "persistence probability" is associated to a cluster. Then the cluster is defined as an "α\alpha-community" if such a probability is not smaller than α\alpha. Consistently, a partition composed of α\alpha-communities is an "α\alpha-partition". These definitions turn out to be very effective for finding and testing communities. If a set of candidate partitions is available, setting the desired α\alpha-level allows one to immediately select the α\alpha-partition with the finest decomposition. Simultaneously, the persistence probabilities quantify the significance of each single community. Given its ability in individually assessing the quality of each cluster, this approach can also disclose single well-defined communities even in networks which overall do not possess a definite clusterized structure.

Keywords

Cite

@article{arxiv.1106.0596,
  title  = {Finding and testing network communities by lumped Markov chains},
  author = {Carlo Piccardi},
  journal= {arXiv preprint arXiv:1106.0596},
  year   = {2011}
}
R2 v1 2026-06-21T18:17:11.432Z