A-localized states for clock models on trees and their extremal decomposition into glassy states
Abstract
We consider Zq-valued clock models on a regular tree, for general classes of ferromagnetic nearest neighbor interactions which have a discrete rotational symmetry. It has been proved recently that, at strong enough coupling, families of homogeneous Markov chain Gibbs states μA coexist whose single-site marginals concentrate on A⊂ Zq, and which are not convex combinations of each other [AbHeKuMa24]. In this note, we aim at a description of the extremal decomposition of μA for |A|≥ 2 into all extremal Gibbs measures, which may be spatially inhomogeneous. First, we show that in regimes of very strong coupling, μA is not extremal. Moreover, μA possesses a single-site reconstruction property which holds for spin values sent from the origin to infinity, when these initial values are chosen from A. As our main result, we show that μA decomposes into uncountably many extremal inhomogeneous states. The proof is based on multi-site reconstruction which allows to derive concentration properties of branch overlaps. Our method is based on a new good site/bad site decomposition adapted to the A-localization property, together with a coarse graining argument in local state space.
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