Reentrant Random Quantum Ising Antiferromagnet

Abstract

We consider the quantum Ising chain with uniformly distributed random antiferromagnetic couplings (1 Ji 2) and uniformly distributed random transverse fields (0 i 20) in the presence of a homogeneous longitudinal field, h. Using different numerical techniques (DMRG, combinatorial optimisation and strong disorder RG methods) we explore the phase diagram, which consists of an ordered and a disordered phase. At one end of the transition line (h=0,0=1) there is an infinite disorder quantum fixed point, while at the other end (h=2,0=0) there is a classical random first-order transition point. Close to this fixed point, for h>2 and 0>0 there is a reentrant ordered phase, which is the result of quantum fluctuations by means of an order through disorder phenomenon.