Controllability of the Periodic Quantum Ising Spin Chain

TL;DR

This paper analyzes the controllability of a quantum Ising spin chain with periodic boundary conditions, characterizing the dynamical Lie algebra and the set of reachable states for the system.

Contribution

It provides a detailed characterization of the dynamical Lie algebra for the periodic quantum Ising chain, revealing its structure and implications for controllability.

Findings

The dynamical Lie algebra is a (3n-1)-dimensional subalgebra of su(2^n).

The algebra decomposes into a center and a semisimple part, simplifying control analysis.

Control reduces to simultaneous control of n-1 spins, modulo the center.

Abstract

In this paper, we present a controllability analysis of the quantum Ising periodic chain of n spin 1/2 particles where the interpolating parameter between the two Hamiltonians plays the role of the control. A fundamental result in the control theory of quantum systems states that the set of achievable evolutions is (dense in) the Lie group corresponding to the Lie algebra generated by the Hamiltonians of the system. Such a dynamical Lie algebra therefore characterizes all the state transitions available for a given system. For the Ising spin periodic chain we characterize such a dynamical Lie algebra and therefore the set of all reachable states. In particular, we prove that the dynamical Lie algebra is a (3n-1)-dimensional Lie sub-algebra of su(2^n) which is a direct sum of a two dimensional center and a (3n-3)-dimensional semisimple Lie subalgebra. This in turn is the direct sum of n-1 Lie algebras isomorphic to su(2) parametrized by the eigenvalues of a fixed matrix. We display the basis for each of these Lie subalgebras. Therefore the problem of control for the Ising spin periodic chain is, modulo the two dimensional center, a problem of simultaneous control of n-1 spin 1/2 particles. In the process of proving this result, we develop some tools which are of general interest for the controllability analysis of quantum systems with symmetry.