Add to ORKGA Lagrangian surface hopping algorithm is implemented to study the two dimensional massless Dirac equation for Graphene with an electrostatic potential, in the semiclassical regime. In this problem, the crossing of the energy levels of the system at Dirac points requires a particular treatment in the algorithm in order to describe the quantum transition– characterized by the Landau-Zener probability– between different energy levels. We first derive the Landau-Zener probability for the underlying problem, then incorporate it into the surface hopping algorithm. We also show that different asymptotic models for this problem derived in [O. Morandi, F. Schürrer, J. Phys. A: Math. Theor. 44 (2011)] may give different transition probabilities. We ...
The Graphene is a two-dimensional(2-D) semiconductor crystal with null gap, where charge carriers b...
This article provides a pedagogical review on Klein tunneling in graphene, i.e. the peculi...
International audienceA discrete-time Quantum Walk (QW) is essentially an operator driving the evolu...
In this article, we propose a new numerical model for computation of the transport of electrons in a...
We propose a simple Hamiltonian to describe the motion and the merging of Dirac points in the electr...
We investigate the simulations of the the Schrödinger equation using the onedimensional quantum latt...
We provide a setup for generalizing the two-dimensional pseudospin S = 1/2 Dirac equation, arising i...
Transmission probabilities of Dirac fermions in graphene under linear barrier potential oscillating ...
In a nucleonic propagation through conical crossings of electronic energy levels, the codimension tw...
Graphene has been actively researched because its low energy electronic Hamiltonian is the relativis...
We study the Landau level spectrum of bulk graphene monolayers beyond the Dirac Hamiltonian with lin...
International audienceWe present and analyze two mathematical models for the self consistent quantum...
Trajectory surface hopping (TSH) is one of the most widely used quantum-classical algorithms for non...
We study the Landau level spectrum of bulk graphene monolayers beyond the Dirac Hamiltonian with lin...
Dirac-like Hamiltonians, linear in momentum k, describe the low-energy physics of a large set of nov...
The Graphene is a two-dimensional(2-D) semiconductor crystal with null gap, where charge carriers b...
This article provides a pedagogical review on Klein tunneling in graphene, i.e. the peculi...
International audienceA discrete-time Quantum Walk (QW) is essentially an operator driving the evolu...
In this article, we propose a new numerical model for computation of the transport of electrons in a...
We propose a simple Hamiltonian to describe the motion and the merging of Dirac points in the electr...
We investigate the simulations of the the Schrödinger equation using the onedimensional quantum latt...
We provide a setup for generalizing the two-dimensional pseudospin S = 1/2 Dirac equation, arising i...
Transmission probabilities of Dirac fermions in graphene under linear barrier potential oscillating ...
In a nucleonic propagation through conical crossings of electronic energy levels, the codimension tw...
Graphene has been actively researched because its low energy electronic Hamiltonian is the relativis...
We study the Landau level spectrum of bulk graphene monolayers beyond the Dirac Hamiltonian with lin...
International audienceWe present and analyze two mathematical models for the self consistent quantum...
Trajectory surface hopping (TSH) is one of the most widely used quantum-classical algorithms for non...
We study the Landau level spectrum of bulk graphene monolayers beyond the Dirac Hamiltonian with lin...
Dirac-like Hamiltonians, linear in momentum k, describe the low-energy physics of a large set of nov...
The Graphene is a two-dimensional(2-D) semiconductor crystal with null gap, where charge carriers b...
This article provides a pedagogical review on Klein tunneling in graphene, i.e. the peculi...
International audienceA discrete-time Quantum Walk (QW) is essentially an operator driving the evolu...