$\pi$ mode lasing in the non-Hermitian Floquet topological system

TL;DR

This paper demonstrates the realization of thresholdless topological $$ mode lasing in a non-Hermitian Floquet SSH waveguide array with structured gain and losses, highlighting control over mode localization and stability.

Contribution

It introduces a novel topological Floquet laser supporting stable, thresholdless $$ mode lasing in a nonlinear, non-Hermitian system with structured gain and losses.

Findings

Stable lasing in $$ mode achieved at low gain-loss amplitudes.

Lasing $$ modes can be localized by adjusting waveguide oscillation amplitude.

The system supports thresholdless, topologically protected lasing states.

Abstract

$\pi$ modes are unique topological edge states appearing in Floquet systems with periodic modulations of the underlying lattice structure in evolution variable, such as dynamically modulated Su-Schrieffer-Heeger (SSH) lattices. These edge states are anomalous states usually appearing between Floquet replicas of the same band, even if standard topological index remains zero for this band. While linear and nonlinear $\pi$ modes were observed in conservative systems, they have never been studied in nonlinear regime in the non-Hermitian systems with structured gain and losses. Here we show that SSH waveguide array with periodically oscillating waveguide positions in propagation direction and with parity-time symmetric refractive index landscape, can support $\pi$ modes that are damped or amplified at different ends of the array. By including nonlinearity and nonlinear absorption into our continuous system, we achieve stable lasing in $\pi$ mode at one end of the array. The representative feature of this system is that lasing in it is thresholdless and it occurs even at low gain-loss amplitudes. The degree of localization of lasing $\pi$ modes can be flexibly controlled by the amplitude of transverse waveguide oscillations. This work therefore introduces a new type of topological Floquet laser and a route to manipulation of $\pi$ modes by structured gain and losses.