$q$th-root non-Hermitian Floquet topological insulators

Abstract

Floquet phases of matter have attracted great attention due to their dynamical and topological nature that are unique to nonequilibrium settings. In this work, we introduce a generic way of taking any integer qqth-root of the evolution operator UU that describes Floquet topological matter. We further apply our qqth-rooting procedure to obtain 2^n2nth- and 3^n3nth-root first- and second-order non-Hermitian Floquet topological insulators~(FTIs). There, we explicitly demonstrate the presence of multiple edge and corner modes at fractional quasienergies \pm(0,1,...2^{n})\pi/2^{n}±(0,1,...2n)π/2n and \pm(0,1,...,3^{n})\pi/3^{n}±(0,1,...,3n)π/3n, whose numbers are highly controllable and capturable by the topological invariants of their parent systems. Notably, we observe non-Hermiticity induced fractional-quasienergy corner modes and the coexistence of non-Hermitian skin effect with fractional-quasienergy edge states. Our findings thus establish a framework of constructing an intriguing class of topological matter in Floquet open systems.