Random Transverse Field Spin-Glass Model on the Cayley tree : phase transition between the two Many-Body-Localized Phases

Abstract

The quantum Ising model with random couplings and random transverse fields on the Cayley tree is studied by Real-Space-Renormalization in order to construct the whole set of eigenstates. The renormalization rules are analyzed via large deviations. The phase transition between the paramagnetic and the spin-glass Many-Body-Localized phases involves the activated exponent =1 and the correlation length exponent =1. The spin-glass-ordered cluster containing NSG spins is found to be extremely sparse with respect to the total number N of spins : its size grows only logarithmically at the critical point NSGcriti N, and it is sub-extensive NSG Nθ in the finite region of the spin-glass phase where the continuously varying exponent θ remains in the interval 0<θ<1.