Finitely Correlated States Driven by Topological Dynamics

Abstract

Let (Ω, ¶) be a standard probability space and let :Ω Ω be a measure preserving ergodic homeomorphism. Let A be a C*-algebra with a unit and let AZ be the quasi-local algebra associated to the spin chain with one-site algebra A. Equip AZ with the group action of translation by k-units, τk∈ Aut(AZ) for k∈ Z. We study the problem of finding a disordered matrix product state decomposition for disordered states ψ(ω) on AZ with the covariance symmetry condition ψ(ω) τk = ψ(k ω). This can be seen as an ergodic generalization of the results of Fannes, Nachtergaele, and Werner [31]. To reify our structure theory, we present a disordered state νω obtained by sampling the AKLT model [2] in parameter space. We go on to show that νω has a nearest-neighbor parent Hamiltonian, its bulk spectral gap closes, but it has almost surely exponentially decaying correlations, and finally, that νω is time-reversal invariant with a Tasaki index of -1 almost surely.