Periodic driving of a quantum system can enable new topological phases with no analog in static systems. In this paper, we systematically classify one-dimensional topological and symmetry-protected topological (SPT) phases in interacting fermionic and bosonic quantum systems subject to periodic driving, which we dub Floquet SPTs (FSPTs). For physical realizations of interacting FSPTs, many-body localization by disorder is a crucial ingredient, required to obtain a stable phase that does not catastrophically heat to infinite temperature. We demonstrate that 1D bosonic and fermionic FSPT phases are classified by the same criteria as equilibrium phases but with an enlarged symmetry group G[over ˜], which now includes discrete time translation ...
Clean and interacting periodically driven systems are believed to exhibit a single, trivial "infinit...
Periodically driven systems play a prominent role in optical lattices. In these ultracold atomic sys...
In recent experiments, time-dependent periodic fields are used to create exotic topological phases o...
Periodic driving of a quantum system can enable new topological phases with no analog in static syst...
Periodic driving of a quantum system can enable new topological phases with no analog in static syst...
Recent work suggests that a sharp definition of "phase of matter" can be given for periodically driv...
We show how second-order Floquet engineering can be employed to realize systems in which many-body l...
We construct and classify chiral topological phases in driven (Floquet) systems of strongly interact...
We construct and classify chiral topological phases in driven (Floquet) systems of strongly interact...
Symmetry-protected topological (SPT) phases are bulk-gapped quantum phases with symmetries, which ha...
This thesis is concerned with phases of matter, one of the central notions in condensed matter physi...
We present a unified perspective on symmetry protected topological (SPT) phases in one dimension and...
We calculate the Floquet quasienergy spectra of several parity-time (PT) symmetric one-dimensional l...
The interplay of symmetry, topology, and many-body effects in the classification of phases of matter...
The interplay of symmetry, topology, and many-body effects in the classification of phases of matter...
Clean and interacting periodically driven systems are believed to exhibit a single, trivial "infinit...
Periodically driven systems play a prominent role in optical lattices. In these ultracold atomic sys...
In recent experiments, time-dependent periodic fields are used to create exotic topological phases o...
Periodic driving of a quantum system can enable new topological phases with no analog in static syst...
Periodic driving of a quantum system can enable new topological phases with no analog in static syst...
Recent work suggests that a sharp definition of "phase of matter" can be given for periodically driv...
We show how second-order Floquet engineering can be employed to realize systems in which many-body l...
We construct and classify chiral topological phases in driven (Floquet) systems of strongly interact...
We construct and classify chiral topological phases in driven (Floquet) systems of strongly interact...
Symmetry-protected topological (SPT) phases are bulk-gapped quantum phases with symmetries, which ha...
This thesis is concerned with phases of matter, one of the central notions in condensed matter physi...
We present a unified perspective on symmetry protected topological (SPT) phases in one dimension and...
We calculate the Floquet quasienergy spectra of several parity-time (PT) symmetric one-dimensional l...
The interplay of symmetry, topology, and many-body effects in the classification of phases of matter...
The interplay of symmetry, topology, and many-body effects in the classification of phases of matter...
Clean and interacting periodically driven systems are believed to exhibit a single, trivial "infinit...
Periodically driven systems play a prominent role in optical lattices. In these ultracold atomic sys...
In recent experiments, time-dependent periodic fields are used to create exotic topological phases o...