EXACT PHASE TRANSITIONS FOR STOCHASTIC BLOCK MODELS AND RECONSTRUCTION ON TREES

In this paper we continue to rigorously establish the predictions in ground breaking work in statistical physics by Decelle, Krzakala, Moore, Zdeborová (Phys. Rev. E 84 (2011) 066106) regarding the block model, in particular, in the case of q = 3 and q = 4 communities. We prove that, for q = 3 and q = 4, there is no computational-statistical gap if the average degree is above some constant by showing it is information theoretically impossible to detect below the Kesten–Stigum bound. The proof is based on showing that, for the broadcast process on Galton– Watson trees, reconstruction is impossible for q = 3 and q = 4 if the average degree is sufficiently large. This improves on the result of Sly (Ann. Probab. 39 (2011) 1365–1406), who proved similar results for regular trees for q = 3. Our analysis of the critical case q = 4 provides a detailed picture showing that the tightness of the Kesten–Stigum bound in the antiferromagnetic case depends on the average degree of the tree. Our results prove conjectures of Decelle, Krzakala, Moore, Zdeborová (Phys. Rev. E 84 (2011) 066106), Moore (Bull. Eur. Assoc. Theor. Comput. Sci. EATCS 121 (2017) 26–61), Abbe and Sandon (Comm. Pure Appl. Math. 71 (2018) 1334–1406) and Ricci-Tersenghi, Semerjian, and Zdeborová (Phys. Rev. E 99 (2019) 042109). Our proofs are based on a new general coupling of the tree and graph processes and on a refined analysis of the broadcast process on the tree.