The divergence of the thermal conductivity in the thermodynamic limit is thoroughly investigated. The divergence law is consistently determined with two different numerical approaches based on equilibrium and nonequilibrium simulations. A possible explanation in the framework of linear-response theory is also presented, which traces back the physical origin of this anomaly to the slow diffusion of the energy of long-wavelength Fourier modes. Finally, the results of dynamical simulations are compared with the predictions of mode-coupling theory
We provide firm convincing evidence that the energy transport in a one-dimensional gas of elasticall...
Commonly, thermal transport properties of one-dimensional systems are found to be anomalous. Here, w...
The dimensional crossover phenomena of heat conduction is studied by a two-dimensional (2D) Fermi-Pa...
We discuss the thermal conductivity of a chain of coupled rotators, showing that it is the first exa...
We discuss the thermal conductivity of a chain of coupled rotators, showing that it is the first exa...
We numerically study heat conduction in a few one-dimensional Fermi-Pasta-Ulam (FPU)-type lattices b...
We examine the temperature dependence of thermal conductivity of one-dimensional nonlinear (anharmon...
One-dimensional particle chains are fundamental models to explain anomalous thermal conduction in lo...
10.1103/PhysRevE.86.040101Physical Review E - Statistical, Nonlinear, and Soft Matter Physics864-PLE...
The thermal conductance of a homogeneous 1D nonlinear lattice system with neareast-neighbor interact...
We study heat conduction and other nonequilibrium properties of one dimensional chain of particles, ...
It is well known that the contribution of harmonic phonons to the thermal conductivity of 1D systems...
Heat conduction is an important energy transport process in nature. Phonon is the major energy carri...
The paper revisits recent counterintuitive results on the divergence of the heat conduction coeffici...
International audienceWe study the thermal conductivity of the one dimensional Toda lattice perturbe...
We provide firm convincing evidence that the energy transport in a one-dimensional gas of elasticall...
Commonly, thermal transport properties of one-dimensional systems are found to be anomalous. Here, w...
The dimensional crossover phenomena of heat conduction is studied by a two-dimensional (2D) Fermi-Pa...
We discuss the thermal conductivity of a chain of coupled rotators, showing that it is the first exa...
We discuss the thermal conductivity of a chain of coupled rotators, showing that it is the first exa...
We numerically study heat conduction in a few one-dimensional Fermi-Pasta-Ulam (FPU)-type lattices b...
We examine the temperature dependence of thermal conductivity of one-dimensional nonlinear (anharmon...
One-dimensional particle chains are fundamental models to explain anomalous thermal conduction in lo...
10.1103/PhysRevE.86.040101Physical Review E - Statistical, Nonlinear, and Soft Matter Physics864-PLE...
The thermal conductance of a homogeneous 1D nonlinear lattice system with neareast-neighbor interact...
We study heat conduction and other nonequilibrium properties of one dimensional chain of particles, ...
It is well known that the contribution of harmonic phonons to the thermal conductivity of 1D systems...
Heat conduction is an important energy transport process in nature. Phonon is the major energy carri...
The paper revisits recent counterintuitive results on the divergence of the heat conduction coeffici...
International audienceWe study the thermal conductivity of the one dimensional Toda lattice perturbe...
We provide firm convincing evidence that the energy transport in a one-dimensional gas of elasticall...
Commonly, thermal transport properties of one-dimensional systems are found to be anomalous. Here, w...
The dimensional crossover phenomena of heat conduction is studied by a two-dimensional (2D) Fermi-Pa...