Integrable mixing of An-1 type vertex models

Abstract

Given a family of monodromy matrices Tu; u=0,1,...,K-1 corresponding to integrable anisotropic vertex models of A(nu)-1-type, we build up a related mixed vertex model by means of glueing the lattices on which they are defined, in such a way that integrability property is preserved. Algebraically, the glueing process is implemented through one dimensional representations of rectangular matrix algebras A(Rp,Rq), namely, the `glueing matrices' zetau. Here Rn indicates the Yang-Baxter operator associated to the standard Hopf algebra deformation of the simple Lie algebra An-1. We show there exists a pseudovacuum subspace with respect to which algebraic Bethe ansatz can be applied. For each pseudovacuum vector we have a set of nested Bethe ansatz equations identical to the ones corresponding to an Am-1 quasi-periodic model, with m equal to the minimal range of involved glueing matrices.