Contiguity and non-reconstruction results for planted partition models: the dense case

Abstract

We consider the two block stochastic block model on n nodes with asymptotically equal cluster sizes. The connection probabilities within and between cluster are denoted by pn:=ann and qn:=bnn respectively. Mossel et al.(2012) considered the case when an=a and bn=b are fixed. They proved the probability models of the stochastic block model and that of Erd\"os-R\'enyi graph with same average degree are mutually contiguous whenever (a-b)2<2(a+b) and are asymptotically singular whenever (a-b)2>2(a+b). Mossel et al.(2012) also proved that when (a-b)2<2(a+b) no algorithm is able to find an estimate of the labeling of the nodes which is positively correlated with the true labeling. It is natural to ask what happens when an and bn both grow to infinity. We prove that their results extend to the case when an=o(n) and bn=o(n). We also consider the case when ann p ∈ (0,1) and (an-bn)2= (an+bn). Observe that in this case bnn p also. We show that here the models are mutually contiguous if (an-bn)2< 2(1-p)(an+bn) and they are asymptotically singular if (an-bn)2 > 2(1-p)(an+bn). Further we also prove it is impossible find an estimate of the labeling of the nodes which is positively correlated with the true labeling whenever (an-bn)2< 2(1-p)(an+bn). The results of this paper justify the negative part of a conjecture made in Decelle et al.(2011) for dense graphs.