English

Non-Hermitian $\mathrm{sl}(3, \mathbb{C})$ three-mode couplers

Quantum Physics 2026-02-10 v2

Abstract

Photonic systems with exceptional points, where eigenvalues and corresponding eigenstates coalesce, have attracted interest due to their topological features and enhanced sensitivity to external perturbations. Non-Hermitian mode-coupling matrices provide a tractable analytic framework to model gain, loss, and chirality across optical, electronic, and mechanical platforms without the complexity of full open-system dynamics. Exceptional points define their spectral topology, and enable applications in mode control, amplification, and sensing. Yet NN-mode couplers, the minimal setting for NNth-order exceptional points, are often studied in specific designs that overlook their algebraic structure. We introduce a general sl(N,C)\mathrm{sl}(N,\mathbb{C}) framework for arbitrary NN-mode couplers in classical and quantum regimes, and develop it explicitly for N=3N=3. This case admits algebraic diagonalization, where a propagation-dependent gauge aligns local and dynamical spectra and reveals the geometric phase connecting adiabatic and exact propagation. An exact Wei--Norman propagator captures the full dynamics and makes crossing exceptional points explicit. Our framework enables classification of coupler families. We study the family spanning PT\mathcal{PT}-symmetric and non-Hermitian cyclic couplers, where two exceptional points of order three lie within a continuum of exceptional points of order two, ruling out pure encircling. As an application, we study these exceptional points for a lossy three-leg beam splitter and reveal its propagation dynamics as a function of initial states, such as Fock and NOON states. Our approach provides a systematic route to analyze non-Hermitian mode couplers and guide design in classical and quantum platforms.

Keywords

Cite

@article{arxiv.2510.24047,
  title  = {Non-Hermitian $\mathrm{sl}(3, \mathbb{C})$ three-mode couplers},
  author = {B. M. Rodriguez-Lara and H. Ghaemi-Dizicheh and S. Dehdashti and A. Hanke and A. Touhami and J. Nötzel},
  journal= {arXiv preprint arXiv:2510.24047},
  year   = {2026}
}

Comments

34 pages, 9 figures

R2 v1 2026-07-01T07:08:56.522Z