Entanglement Perturbation Theory for Infinite Quasi-1D Quantum Systems

Abstract

We develop Entanglement Perturbation Theory (EPT) for infinite Quasi-1D quantum systems. The spin 1/2 Heisenberg chain with ferromagnetic nearest neighbor (NN) and antiferromagnetic next nearest neighbor (NNN) interactions with an easy-plane anisotropy is studied as a prototypical system. The obtained accurate phase diagram is compared with a recent prediction [Phys.Rev.B,81,094430(2010)] that dimer and Neel orders appear alternately as the XXZ anisotropy Delta approaches the isotropic limit Delta=1. The first and second transitions (across dimer, Neel, and dimer phases) are detected with improved accuracy at Delta≈ 0.722 and 0.930. The third transition (from dimer to Neel phases), previously predicted to be at Delta≈ 0.98, is not detected at this Delta in our method, raising the possibility that the second Neel phase is absent.