Community Detection with Colored Edges

Abstract

In this paper, we prove a sharp limit on the community detection problem with colored edges. We assume two equal-sized communities and there are m different types of edges. If two vertices are in the same community, the distribution of edges follows pi=αin/n for 1≤ i ≤ m, otherwise the distribution of edges is qi=βin/n for 1≤ i ≤ m, where αi and βi are positive constants and n is the total number of vertices. Under these assumptions, a fundamental limit on community detection is characterized using the Hellinger distance between the two distributions. If Σi=1m (αi - βi)2 >2, then the community detection via maximum likelihood (ML) estimator is possible with high probability. If Σi=1m (αi - βi)2 < 2, the probability that the ML estimator fails to detect the communities does not go to zero.