The characteristic polynomial of the next-nearest-neighbour qubit chain for single excitations

TL;DR

This paper derives an exact analytical form of the characteristic polynomial for a chain of dipole-coupled atoms with next-nearest-neighbour interactions, facilitating the study of eigenvalues and eigenvectors for single-photon excitations.

Contribution

It introduces a Chebyshev polynomial-based exact form of the characteristic polynomial and a power series method for roots, advancing the analysis of eigenvalues in complex atomic chains.

Findings

Exact polynomial form valid for arbitrary atoms and couplings

Power series expansion for roots in coupling constants

Insights into properties of energy eigenvalues

Abstract

The characteristic polynomial for a chain of dipole-dipole coupled two-level atoms with nearest-neighbour and next-nearest-neighbour interactions is developed for the study of eigenvalues and eigenvectors for single-photon excitations. We find the exact form of the polynomial in terms of the Chebyshev polynomials of the second kind that is valid for an arbitrary number of atoms and coupling strengths. We then propose a technique for expressing the roots of the polynomial as a power series in the coupling constants. The general properties of the solutions are also explored, to shed some light on the general properties that the exact, analytic form of the energy eigenvalues should have. A method for deriving the eigenvectors of the Hamiltonian is also outlined.