Algebraic Bethe ansatz for U(1) Invariant Integrable Models: Compact and non-Compact Applications

TL;DR

This paper extends the algebraic Bethe ansatz to various U(1) integrable models, including compact and non-compact cases, providing explicit eigenvalue expressions and analyzing their properties through limits from finite systems.

Contribution

It offers explicit solutions for both compact and non-compact U(1) integrable models, including transfer matrix eigenvalues and factorization properties, unifying finite and infinite-dimensional cases.

Findings

Explicit on-shell and off-shell eigenvalue expressions for all models.

Factorization of non-parallel vector amplitudes into elementary functions.

Non-compact model properties derived from finite systems via limits.

Abstract

We apply the algebraic Bethe ansatz developed in our previous paper \cite{CM} to three different families of U(1) integrable vertex models with arbitrary $N$ bond states. These statistical mechanics systems are based on the higher spin representations of the quantum group $U_q[SU(2)]$ for both generic and non-generic values of $q$ as well as on the non-compact discrete representation of the $SL(2,{\cal R})$ algebra. We present for all these models the explicit expressions for both the on-shell and the off-shell properties associated to the respective transfer matrices eigenvalue problems. The amplitudes governing the vectors not parallel to the Bethe states are shown to factorize in terms of elementary building blocks functions. The results for the non-compact $SL(2,{\cal R})$ model are argued to be derived from those obtained for the compact systems by taking suitable $N \to \infty$ limits. This permits us to study the properties of the non-compact $SL(2,{\cal R})$ model starting from systems with finite degrees of freedom.