Your search keyword '"Hua-Tong Yang"' showing total 3 results

1. Sudden jumps and plateaus in the quench dynamics of a Bloch state

Author

J. M. Zhang and Hua-Tong Yang

Subjects

Physics, Scattering, Dynamics (mechanics), Time evolution, General Physics and Astronomy, FOS: Physical sciences, Probability density function, Function (mathematics), 01 natural sciences, 010305 fluids & plasmas, Classical mechanics, Survival probability, Quantum Gases (cond-mat.quant-gas), 0103 physical sciences, Periodic boundary conditions, 010306 general physics, Condensed Matter - Quantum Gases, Bloch wave

Abstract

We take a one-dimensional tight binding chain with periodic boundary condition and put a particle in an arbitrary Bloch state, then quench it by suddenly changing the potential of an arbitrary site. In the ensuing time evolution, the probability density of the wave function at an arbitrary site \emph{jumps indefinitely between plateaus}. This phenomenon adds to a former one in which the survival probability of the particle in the initial Bloch state shows \emph{cusps} periodically, which was found in the same scenario [Zhang J. M. and Yang H.-T., EPL, \textbf{114} (2016) 60001]. The plateaus support the scattering wave picture of the quench dynamics of the Bloch state. Underlying the cusps and jumps is the exactly solvable, nonanalytic dynamics of a Luttinger-like model, based on which, the locations of the jumps and the heights of the plateaus are accurately predicted., final version

Published

2016

2. Cusps in the quench dynamics of a Bloch state

Author

Hua-Tong Yang and J. M. Zhang

Subjects

Physics, Quantum Physics, Dynamics (mechanics), General Physics and Astronomy, FOS: Physical sciences, 01 natural sciences, 010305 fluids & plasmas, Tight binding, Survival probability, 0103 physical sciences, Energy spectrum, Periodic boundary conditions, 010306 general physics, Quantum Physics (quant-ph), Mathematical physics, Bloch wave

Abstract

We report some nonsmooth dynamics of a Bloch state in a one-dimensional tight binding model with the periodic boundary condition. After a sudden change of the potential of an arbitrary site, quantities like the survival probability of the particle in the initial Bloch state show cusps periodically, with the period being the Heisenberg time associated with the energy spectrum. This phenomenon is a \emph{nonperturbative} counterpart of the nonsmooth dynamics observed previously (Zhang and Haque, arXiv:1404.4280) in a periodically driven tight binding model. Underlying the cusps is an exactly solvable model, which consists of equally spaced levels extending from $-\infty$ to $+\infty $, between which two arbitrary levels are coupled to each other by the same strength., Comment: To appear in EPL. New cusps found

Published

2016

3. Some exact identities connecting one- and two-particle Green's functions in spin-orbit coupling systems

Author

Hua-Tong Yang

Subjects

Physics, Coupling, Condensed Matter - Mesoscale and Nanoscale Physics, General Physics and Astronomy, FOS: Physical sciences, Electron, Spin–orbit interaction, Identity (mathematics), Quantum transport, Quantum mechanics, Mesoscale and Nanoscale Physics (cond-mat.mes-hall), Particle, Coupling system, Condensed Matter::Strongly Correlated Electrons, Spin-½, Mathematical physics

Abstract

Some exact identities connecting the one- and two-particle Green's functions in the presence of spin-orbit coupling have been derived. These identities is similar to the usual Ward identity in the particle or charge transport theory and a satisfying spin transport theory in spin-orbit coupling system should also preserve these identities., Comment: 6 pages

Published

2007