Tunable quantum spin chain with three-body interactions

TL;DR

This paper introduces a tunable quantum spin chain model with three-body interactions, exploring its phase diagram, ground states, and energy spectrum, with analytical and numerical validation of its properties.

Contribution

It presents a generalized Fredkin spin chain with adjustable parameters, exactly solvable regions, and detailed analysis of ground states and spectral features.

Findings

Ground state often exhibits Dyck word structure

Energy level spacing can be exponentially small

Model's phase boundary is a circle in parameter space

Abstract

We introduce a generalization of the Fredkin spin chain with tunable three-body interactions expressed in terms of conventional spin-half operators. Of the model's two free parameters, one controls the preference for Ising antiferromagnetism and the other controls the strength of quantum fluctuations. In this formulation, the so-called $t$-deformed model (an exactly solvable, frustration-free Hamiltonian) lives on a unit circle centered on the origin of the phase diagram. The circle demarcates the boundary between ferromagnetic order inside and various antiferromagnetic phases outside. Throughout most of the non-ferromagnetic parts of the phase diagram, the ground state has Dyck word form: i.e., all contributing spin configurations exhibit perfect matching and nesting of spin up and spin down. The exceptions are two regions in which Dyck word mismatches are energetically favorable. We remark that in those regions the energy level spacing can be exponentially small in the system size. It is also the case that exact diagonalization reveals a highly idiosyncratic energy spectrum, presumably because the hard spin twist at the chain ends induces strong incommensurability effects on the bulk system when the chain length is small. As a convergence check, we benchmark our DMRG results to near-double-precision floating-point accuracy against analytical results at exactly solvable points and against exact diagonalization results for small system sizes across the entire parameter space.