Engineering Floquet topological phases using elliptically polarized light

TL;DR

This paper explores how elliptically polarized light can induce and control topological phases in a 2D system, revealing a rich phase diagram with tunable topological properties via light polarization parameters.

Contribution

It demonstrates how elliptically polarized light can be used to engineer and manipulate Floquet topological phases in a 2D model, expanding the methods for topological phase control.

Findings

Topological phase diagram depends on light polarization parameters.

Chern number correlates with edge states in nanoribbon geometry.

Elliptical polarization offers a versatile way to tune topological phases.

Abstract

We study a two-dimensional topological system driven out of equilibrium by the application of elliptically polarized light. In particular, we analyze the Bernevig-Hughes-Zhang model when it is perturbed using an elliptically polarized light of frequency $\Omega$ described in general by a vector potential ${\bf A}(t) = (A_{0x} \cos(\Omega t), A_{0y} \cos(\Omega t + \phi_0))$. (Linear and circular polarizations can be obtained as special cases of this general form by appropriately choosing $A_{0x}$, $A_{0y}$, and $\phi_0$). Even for a fixed value of $\phi_0$, we can change the topological character of the system by changing the ratio of the $x$ and $y$ components of the drive. We therefore find a rich topological phase diagram as a function of $A_{0x}$, $A_{0y}$ and $\phi_0$. In each of these phases, the topological invariant given by the Chern number is consistent with the number of spin-polarized states present at the edges of a nanoribbon.