Distinct Floquet topological classifications from color-decorated frequency lattices with space-time symmetries

Abstract

We consider nontrivial topological phases in Floquet systems using unitary loops and stroboscopic evolutions under a static Floquet Hamiltonian HF in the presence of dynamical space-time symmetries G. While the latter has been subject of out-of-equilibrium classifications that extend the ten-fold way and systems with additional crystalline symmetries to periodically driven systems, we explore the anomalous topological zero modes that arise in HF from the coexistence of a dynamical space-time symmetry M and antisymmetry A of G, and classify them using a frequency-domain formulation. Moreover, we provide an interpretation of the resulting Floquet topological phases using a frequency lattice with a decoration represented by color degrees of freedom on the lattice vertices. These colors correspond to the coefficient N of the group extension G of G along the frequency lattice, given by N=Z H1[A,M]. The distinct topological classifications that arise at different energy gaps in its quasi-energy spectrum are described by the torsion product of the cohomology group H2[G,N] classifying the group extension.