Add to ORKGWe study chiral models in one spatial dimension, both static and periodically driven. We demonstrate that their topological properties may be read out through the long time limit of a bulk observable, the mean chiral displacement. The derivation of this result is done in terms of spectral projectors, allowing for a detailed understanding of the physics. We show that the proposed detection converges rapidly and it can be implemented in a wide class of chiral systems. Furthermore, it can measure arbitrary winding numbers and topological boundaries, it applies to all non-interacting systems, independently of their quantum statistics, and it requires no additional elements, such as external fields, nor filled bands.Peer Reviewe
Differently from the majority of the other phases of matter, which are characterized by local order ...
We study one-dimensional Floquet topological insulators with chiral symmetry going beyond the standa...
Statistical Topology emerged as topological aspects continue to gain importance in many areas of phy...
We study chiral models in one spatial dimension, both static and periodically driven. We demonstrate...
The topology of one-dimensional chiral systems is captured by the winding number of the Hamiltonian ...
Probing the topological invariants of interacting systems stands as a grand and open challenge. Here...
We show that the bulk winding number characterizing one-dimensional topological insulators with chir...
Topological insulators are fascinating states of matter exhibiting protected edge states and robust ...
We study topological phases in one-dimensional open Floquet systems driven by chiral symmetric nonun...
Recently, several authors have investigated topological phenomena in periodically driven systems of ...
Topological phases are phases of matter that are characterized by discrete quantities known as topol...
We construct and classify chiral topological phases in driven (Floquet) systems of strongly interact...
Topological insulators have Hamiltonians with bulk topological invariants, which control the interes...
We construct and classify chiral topological phases in driven (Floquet) systems of strongly interact...
Differently from the majority of the other phases of matter, which are characterized by local order ...
We study one-dimensional Floquet topological insulators with chiral symmetry going beyond the standa...
Statistical Topology emerged as topological aspects continue to gain importance in many areas of phy...
We study chiral models in one spatial dimension, both static and periodically driven. We demonstrate...
The topology of one-dimensional chiral systems is captured by the winding number of the Hamiltonian ...
Probing the topological invariants of interacting systems stands as a grand and open challenge. Here...
We show that the bulk winding number characterizing one-dimensional topological insulators with chir...
Topological insulators are fascinating states of matter exhibiting protected edge states and robust ...
We study topological phases in one-dimensional open Floquet systems driven by chiral symmetric nonun...
Recently, several authors have investigated topological phenomena in periodically driven systems of ...
Topological phases are phases of matter that are characterized by discrete quantities known as topol...
We construct and classify chiral topological phases in driven (Floquet) systems of strongly interact...
Topological insulators have Hamiltonians with bulk topological invariants, which control the interes...
We construct and classify chiral topological phases in driven (Floquet) systems of strongly interact...
Differently from the majority of the other phases of matter, which are characterized by local order ...
We study one-dimensional Floquet topological insulators with chiral symmetry going beyond the standa...
Statistical Topology emerged as topological aspects continue to gain importance in many areas of phy...