Add to ORKGTopological physics relies on the existence of Hamiltonian's eigenstate singularities carrying a topological charge, such as quantum vortices, Dirac points, Weyl points and -- in non-Hermitian systems -- exceptional points (EPs), lines or surfaces. They appear only in pairs connected by a Fermi arc and are related to a Hermitian singularity, such as a Dirac point. The annihilation of 2D Dirac points carrying opposite charges has been experimentally reported. It remained elusive for Weyl points and second order EPs terminating different Fermi arcs. Here, we observe the annihilation of second order EPs issued from different Dirac points forming distinct valleys. We study a liquid crystal microcavity with voltage-controlled birefringence and T...
The massless solutions to the Dirac equation are described by the so-called Weyl Hamiltonian. The We...
Dirac fermions provide a prototypical description of topological insulators and their gapless bounda...
© 2020, The Author(s).Topological properties of materials are typically presented in momentum space....
Topological physics relies on the existence of Hamiltonian's eigenstate singularities carrying a top...
Non-Hermitian systems distinguish themselves from Hermitian systems by exhibiting a phase transition...
At photonic Dirac points, electromagnetic waves are governed by the same equations as two-component ...
This thesis is dedicated to the study of photonic Dirac systems, the role of their associated topolo...
The ideas of topology have found tremendous success in closed physical systems, but even richer prop...
Both theoretical and experimental studies of topological phases in non-Hermitian systems have made a...
Optical superlattices with sublattice symmetry subjected to a synthetic imaginary gauge field underg...
We analyze chiral topological edge modes in a non-Hermitian variant of the 2D Dirac equation. Such m...
We analyze chiral topological edge modes in a non-Hermitian variant of the 2D Dirac equation. Such m...
The Dirac cone underlies many unique electronic properties of graphene1 and topological insulators, ...
We present our recent theoretical and experimental works regarding ways to generate photonic topolog...
In the past few years, concepts from non-Hermitian (NH) physics, originally developed within the con...
The massless solutions to the Dirac equation are described by the so-called Weyl Hamiltonian. The We...
Dirac fermions provide a prototypical description of topological insulators and their gapless bounda...
© 2020, The Author(s).Topological properties of materials are typically presented in momentum space....
Topological physics relies on the existence of Hamiltonian's eigenstate singularities carrying a top...
Non-Hermitian systems distinguish themselves from Hermitian systems by exhibiting a phase transition...
At photonic Dirac points, electromagnetic waves are governed by the same equations as two-component ...
This thesis is dedicated to the study of photonic Dirac systems, the role of their associated topolo...
The ideas of topology have found tremendous success in closed physical systems, but even richer prop...
Both theoretical and experimental studies of topological phases in non-Hermitian systems have made a...
Optical superlattices with sublattice symmetry subjected to a synthetic imaginary gauge field underg...
We analyze chiral topological edge modes in a non-Hermitian variant of the 2D Dirac equation. Such m...
We analyze chiral topological edge modes in a non-Hermitian variant of the 2D Dirac equation. Such m...
The Dirac cone underlies many unique electronic properties of graphene1 and topological insulators, ...
We present our recent theoretical and experimental works regarding ways to generate photonic topolog...
In the past few years, concepts from non-Hermitian (NH) physics, originally developed within the con...
The massless solutions to the Dirac equation are described by the so-called Weyl Hamiltonian. The We...
Dirac fermions provide a prototypical description of topological insulators and their gapless bounda...
© 2020, The Author(s).Topological properties of materials are typically presented in momentum space....