Mesons in a quantum Ising ladder

TL;DR

This paper investigates meson-like bound states in coupled transverse-field Ising chains, analyzing their spectrum, degeneracies, and stability using analytical and numerical methods, with implications for quantum critical systems.

Contribution

It systematically characterizes meson states in coupled Ising chains, including their masses, degeneracies, and relation to quantum criticality, using Bethe-Salpeter and free fermionic approaches.

Findings

Meson masses are determined by solving the Bethe-Salpeter equation.

Degeneracy in the chain-exchanging odd sectors is confirmed.

The stability of particles near quantum criticality is analyzed with form factor perturbation.

Abstract

When two transverse-field Ising chains (TFICs) with magnetic order are coupled, the original free excitations become confined, giving rise to meson-like bound states. In this work, we study such bound states systematically. The mesons are characterized by their fermion number parity and chain-exchanging properties, which lead to distinct sets of mesonic states. The meson masses are determined by solving the Bethe-Salpter equation. An interesting observation is the additional degeneracy in the chain-exchanging odd sectors. Beyond the two particle approximation, we exploit the truncated free fermionic space approach to calculate the spectrum numerically. Corrections to the meson masses are obtained, and the degeneracy is further confirmed. The characterization and degeneracy can be connected to the situation when each chain is tuned to be quantum critical, where the system is described by the Ising$_h^2$ integrable model, a sine-Gordon theory with $\mathbb{Z}_2$ orbifold. Here we establish a clear correspondence between the particles in the bosonized form and their fermionic counterparts. Near this point, the stability of these particles is analyzed using the form factor perturbation scheme, where four particles are always present. Additionally, we calculate the evolution of the dominant dynamical structure factor for local spin operators, providing further insight into the low-energy excitations and their role in the system's behavior. The two-particle confinement framework as well as the parity classifications may inspire the study for other coupled bi-partite systems.