30 pages, 2 figures; v2: Fixed formatting issues, bibliography and acknowledgementsInternational audienceWe study the strong disorder regime of Floquet topological systems in dimension two, that describe independent electrons on a lattice subject to a periodic driving. In the spectrum of the Floquet propagator we assume the existence of an interval in which all states are localized--a mobility gap. First we generalize the relative construction from spectral to mobility gap, define a bulk index for an infinite sample and an edge index for the half-infinite one and prove the bulk-edge correspondence. Second, we consider completely localized systems where the mobility gap is the whole circle, and define alternative bulk and edge indices that c...
Topological phases are phases of matter that are characterized by discrete quantities known as topol...
Recently, several authors have investigated topological phenomena in periodically driven systems of ...
Over the last decades, both band topology and Anderson transitions, as well as their interplay, have...
We investigate the effects of disorder on a periodically driven one-dimensional model displaying qua...
Topological insulators are usually studied in physics under the assumption of translation invariance...
This dissertation focus on the classification of topological matters in static and periodically driv...
I will discuss the open system dynamics and steady states of two dimensional Floquet topological ins...
The topological properties of electronic band structures are closely related to the degree of locali...
Topological insulators are characterized by the existence of universal, robust and highly non-trivia...
A universal feature of topological insulators is that they cannot be adiabatically connected to an a...
We study topological indices of Fermionic time-reversal invariant topological insulators in two dime...
We investigate the possibility of realizing a disorder-induced topological Floquet spectrum in two-d...
Electromagnetic driving in a honeycomb lattice can induce gaps and topological edge states with a st...
Disorder in a 1D quantum lattice induces Anderson localization of the eigenstates and blocks transpo...
We report the theoretical discovery and characterization of higher-order Floquet topological phases ...
Topological phases are phases of matter that are characterized by discrete quantities known as topol...
Recently, several authors have investigated topological phenomena in periodically driven systems of ...
Over the last decades, both band topology and Anderson transitions, as well as their interplay, have...
We investigate the effects of disorder on a periodically driven one-dimensional model displaying qua...
Topological insulators are usually studied in physics under the assumption of translation invariance...
This dissertation focus on the classification of topological matters in static and periodically driv...
I will discuss the open system dynamics and steady states of two dimensional Floquet topological ins...
The topological properties of electronic band structures are closely related to the degree of locali...
Topological insulators are characterized by the existence of universal, robust and highly non-trivia...
A universal feature of topological insulators is that they cannot be adiabatically connected to an a...
We study topological indices of Fermionic time-reversal invariant topological insulators in two dime...
We investigate the possibility of realizing a disorder-induced topological Floquet spectrum in two-d...
Electromagnetic driving in a honeycomb lattice can induce gaps and topological edge states with a st...
Disorder in a 1D quantum lattice induces Anderson localization of the eigenstates and blocks transpo...
We report the theoretical discovery and characterization of higher-order Floquet topological phases ...
Topological phases are phases of matter that are characterized by discrete quantities known as topol...
Recently, several authors have investigated topological phenomena in periodically driven systems of ...
Over the last decades, both band topology and Anderson transitions, as well as their interplay, have...