This paper studies energy localization conditions in lattices of the type proposed by Peyrard and Bishop. Homogeneous and inhomogeneous lattices are analyzed and the role of interfaces in the latter is emphasized. Simulations allowed us to identify critical energy values for the existence of localization. After a certain energy value, it is possible to observe the loss of energy localization along the chain
We introduce a notion of energy for some microscopic stochastic lattices. Such lattices are broad ge...
I review how the phenomenology of localization applies to fermions in lattice gauge theory, present ...
We present analytically exact results to show that certain quasi–one-dimensional lattices, where the...
We study energy localization on the oscillator chain proposed by Peyrard and Bishop to model DNA. We...
We study energy localization in a finite one-dimensional Phi(4) oscillator chain with initial energy...
The Aubry–André model admits a localization transition from delocalized to localized states in one d...
International audienceLocalization of electronic wave functions in modern two-dimensional (2D) mater...
We study the localization transitions for coupled one-dimensional lattices with quasiperiodic potent...
A localization criterion is derived by using the self-consistent determination of the self-energy in...
We investigated numerically localization properties of electron eigenstates in a chain with long-ran...
We revisit the celebrated model of Fermi, Pasta and Ulam with the aim of investigating, by numerica...
The localization properties of the wave functions of vibrations in two-dimensional (2D) crystals are...
The presence of a topologically non-trivial discrete invariant implies the existence of gapless mode...
We present a generic, problem-independent algorithm for exploration of the low-energy portion of the...
Abstract The aim of this paper is to discuss the problem of energy-momentum localization by using th...
We introduce a notion of energy for some microscopic stochastic lattices. Such lattices are broad ge...
I review how the phenomenology of localization applies to fermions in lattice gauge theory, present ...
We present analytically exact results to show that certain quasi–one-dimensional lattices, where the...
We study energy localization on the oscillator chain proposed by Peyrard and Bishop to model DNA. We...
We study energy localization in a finite one-dimensional Phi(4) oscillator chain with initial energy...
The Aubry–André model admits a localization transition from delocalized to localized states in one d...
International audienceLocalization of electronic wave functions in modern two-dimensional (2D) mater...
We study the localization transitions for coupled one-dimensional lattices with quasiperiodic potent...
A localization criterion is derived by using the self-consistent determination of the self-energy in...
We investigated numerically localization properties of electron eigenstates in a chain with long-ran...
We revisit the celebrated model of Fermi, Pasta and Ulam with the aim of investigating, by numerica...
The localization properties of the wave functions of vibrations in two-dimensional (2D) crystals are...
The presence of a topologically non-trivial discrete invariant implies the existence of gapless mode...
We present a generic, problem-independent algorithm for exploration of the low-energy portion of the...
Abstract The aim of this paper is to discuss the problem of energy-momentum localization by using th...
We introduce a notion of energy for some microscopic stochastic lattices. Such lattices are broad ge...
I review how the phenomenology of localization applies to fermions in lattice gauge theory, present ...
We present analytically exact results to show that certain quasi–one-dimensional lattices, where the...