1. Non-Hermitian topological invariant of photonic band structures undergoing inversion
- Author
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Bouteyre, Paul, Nguyen, Dung Xuan, Gachon, Guillaume, Benyattou, Taha, Letartre, Xavier, Viktorovitch, Pierre, Callard, Ségolène, Ferrier, Lydie, and Nguyen, Hai Son
- Subjects
Physics - Optics - Abstract
The interplay between symmetry and topology led to the discovery of symmetry-protected topological phases in Hermitian systems, including topological insulators and topological superconductors. However, the intrinsic symmetry-protected topological characteristics of non-Hermitian systems still await exploration. Here, we investigate experimentally the topological transition associated with the inversion of non-Hermitian band structures in an optical lattice. Intriguingly, we demonstrate that the winding number associated with the symmetry-protected bound state in the continuum is not a conserved quantity after band inversion. To define a topological invariant, we propose the skyrmion number given by spawning in momentum space a pseudo-spin with the polarisation vortex as the in-plane component and the band-index as the pseudo-spin direction at the origin. This leads to a topological transition from an antimeron to an meron-like texture through band inversion, while always conserving the half-charge skyrmion number. We foresee the use of skyrmion number to explore exotic singularities in various non-Hermitian physical system.
- Published
- 2022