Symmetry and Higher-Order Exceptional Points

TL;DR

This paper reveals that symmetries like PT and chiral symmetry significantly increase the occurrence and diversity of higher-order exceptional points in non-Hermitian systems, with distinct topological and dispersive properties.

Contribution

It demonstrates that symmetries reduce the tuning parameters needed for higher-order EPs and identifies their topological and phenomenological distinctions.

Findings

Third-order EPs require only two parameters with certain symmetries.

Different symmetries lead to topologically distinct EPs.

EPs exhibit unique dispersions protected by symmetries.

Abstract

Exceptional points (EPs), at which both eigenvalues and eigenvectors coalesce, are ubiquitous and unique features of non-Hermitian systems. Second-order EPs are by far the most studied due to their abundance, requiring only the tuning of two real parameters, which is less than the three parameters needed to generically find ordinary Hermitian eigenvalue degeneracies. Higher-order EPs generically require more fine-tuning, and are thus assumed to play a much less prominent role. Here, however, we illuminate how physically relevant symmetries make higher-order EPs dramatically more abundant and conceptually richer. More saliently, third-order EPs generically require only two real tuning parameters in the presence of either a parity-time (PT) symmetry or a generalized chiral symmetry. Remarkably, we find that these different symmetries yield topologically distinct types of EPs. We illustrate our findings in simple models, and show how third-order EPs with a generic $\sim k^{1/3}$ dispersion are protected by PT symmetry, while third-order EPs with a $\sim k^{1/2}$ dispersion are protected by the chiral symmetry emerging in non-Hermitian Lieb lattice models. More generally, we identify stable, weak, and fragile aspects of symmetry-protected higher-order EPs, and tease out their concomitant phenomenology.