Quantum relativistic Toda chain at root of unity: isospectrality, modified Q-operator and functional Bethe ansatz

TL;DR

This paper studies a quantum relativistic Toda chain at roots of unity, exploring its isospectrality, modified Q-operators, and the functional Bethe ansatz, revealing new integrable structures and eigenstate constructions.

Contribution

It introduces a modified Baxter Q-operator approach and links classical Bäcklund transformations to quantum eigenstate separation in the relativistic Toda chain.

Findings

Construction of similarity operators via modified Q-operators.

Identification of Bäcklund transformation as a classical limit of the Q-operator.

Explicit projector to eigenstates as a product of modified Q-operators.

Abstract

We investigate an N-state spin model called quantum relativistic Toda chain and based on the unitary finite dimensional representations of the Weyl algebra with q being N-th primitive root of unity. Parameters of the finite dimensional representation of the local Weyl algebra form the classical discrete integrable system. Nontrivial dynamics of the classical counterpart corresponds to isospectral transformations of the spin system. Similarity operators are constructed with the help of modified Baxter's Q-operators. The classical counterpart of the modified Q-operator for the initial homogeneous spin chain is a Baecklund transformation. This transformation creates an extra Hirota-type soliton in a parameterization of the chain structure. Special choice of values of solitonic amplitudes yields a degeneration of spin eigenstates, leading to the quantum separation of variables, or the functional Bethe ansatz. A projector to the separated eigenstates is constructed explicitly as a product of modified Q-operators.