The spectrum properties of an integrable $G_2$ invariant vertex model

TL;DR

This paper analyzes the exact solution of an integrable $G_2$ vertex model, revealing its gapless nature, unique string solutions, and critical behavior governed by two $c=1$ conformal field theories.

Contribution

It provides a detailed Bethe ansatz solution for the $G_2$ vertex model, linking Bethe roots to $G_2$ charges and exploring its critical and finite-size properties.

Findings

The $G_2$ spin chain is gapless with two different sound velocities.

The bulk free energy exhibits three regimes with sharp non-differentiable points.

The critical behavior is described by a product of two $c=1$ conformal field theories.

Abstract

This paper is concerned with the study of properties of the exact solution of the fundamental integrable $G_2$ vertex model. The model $R$-matrix and respective spin chain are presented in terms of the basis generators of the $G_2$ Lie algebra. This formulation permits us to related the number of the Bethe roots of the respective Bethe equations with the eigenvalues of the $U(1)$ conserved charges from the Cartan subalgebra of $G_2$. The Bethe equations are solved by a peculiar string structure which combines complex three-strings with real roots allowing us determine the bulk properties in the thermodynamic limit. We argue that $G_2$ spin chain is gapless but the low-lying excitations have two different speeds of sound and the underlying continuum limit is therefore not strictly Lorentz invariant. We have investigate the finite-size corrections to the ground state energy and proposed that the critical properties of the system should be governed by the product of two $c=1$ conformal field theories. By combining numerical and analytical methods we have computed the bulk free-energy of the $G_2$ vertex model. We found that there are three regimes in the spectral parameter in which the free-energy is limited and continuous. There exists however at least two sharp corner points in which the bulk-free energy is not differentiable.