Phase transitions in community detection: A solvable toy model

Recently, it was shown that there is a phase transition in the community detection problem. This transition was first computed using the cavity method, and has been proved rigorously in the case of q = 2 groups. However, analytic calculations using the cavity method are challenging since they require us to understand probability distributions of messages. We study analogous transitions in the so-called "zero-temperature inference" model, where this distribution is supported only on the most likely messages. Furthermore, whenever several messages are equally likely, we break the tie by choosing among them with equal probability, corresponding to an infinitesimal random external field. While the resulting analysis overestimates the thresholds, it reproduces some of the qualitative features of the system. It predicts a first-order detectability transition whenever q > 2 ( as opposed to q > 4 according to the finite-temperature cavity method). It also has a regime analogous to the "hard but detectable" phase, where the community structure can be recovered, but only when the initial messages are sufficiently accurate. Finally, we study a semisupervised setting where we are given the correct labels for a fraction. of the nodes. For q > 2, we find a regime where the accuracy jumps discontinuously at a critical value of.. Copyright (C) EPLA, 2014