Add to ORKGThe effect of open boundary conditions for four models with quenched disorder are studied in finite samples by numerical ground state calculations. Extrapolation to the infinite volume limit indicates that the configurations in ``windows\u27\u27 of fixed size converge to a unique configuration, up to global symmetries. The scaling of this convergence is consistent with calculations based on the fractal dimension of domain walls. These results provide strong evidence for the ``two-state\u27\u27 picture of the low temperature behavior of these models. Convergence in three-dimensional systems can require relatively large windows
In this paper the three-dimensional random-field Ising model is studied at both zero temperature and...
Despite decades of effort, our understanding of low-temperature phase of spin glass models with shor...
We study a three-dimensional plaquette spin model whose low temperature dynamics is glassy, due to l...
Using a stochastic algorithm introduced in a previous paper, we study the finite size volume correct...
We have performed numerical simulation of a 3-dimensional elastic medium, with scalar displacements,...
Chaotic size dependence makes it extremely difficult to take the thermodynamic limit in disordered s...
With the help of exact ground states obtained by a polynomial algorithm we compute the domain wall e...
Extensive computations of ground-state energies of the Edwards-Anderson spin glass on bond-diluted, ...
The infinite-volume limit behavior of the 2d Ising model under possibly strong random boundary condi...
9 pages, 9 figuresInternational audienceFor Gaussian Spin Glasses in low dimensions, we introduce a ...
We propose an approach toward understanding the spin glass phase at zero and low temperature by stud...
We study the late stages of spinodal decomposition in a Ginzburg-Landau mean field model with quench...
Exact ground states are calculated with an integer optimization algorithm for two- and three-dimensi...
The Imry-Ma phenomenon, predicted in 1975 by Imry and Ma and rigorously established in 1989 by Aizen...
We present a simple strategy in order to show the existence and uniqueness of the infinite volume li...
In this paper the three-dimensional random-field Ising model is studied at both zero temperature and...
Despite decades of effort, our understanding of low-temperature phase of spin glass models with shor...
We study a three-dimensional plaquette spin model whose low temperature dynamics is glassy, due to l...
Using a stochastic algorithm introduced in a previous paper, we study the finite size volume correct...
We have performed numerical simulation of a 3-dimensional elastic medium, with scalar displacements,...
Chaotic size dependence makes it extremely difficult to take the thermodynamic limit in disordered s...
With the help of exact ground states obtained by a polynomial algorithm we compute the domain wall e...
Extensive computations of ground-state energies of the Edwards-Anderson spin glass on bond-diluted, ...
The infinite-volume limit behavior of the 2d Ising model under possibly strong random boundary condi...
9 pages, 9 figuresInternational audienceFor Gaussian Spin Glasses in low dimensions, we introduce a ...
We propose an approach toward understanding the spin glass phase at zero and low temperature by stud...
We study the late stages of spinodal decomposition in a Ginzburg-Landau mean field model with quench...
Exact ground states are calculated with an integer optimization algorithm for two- and three-dimensi...
The Imry-Ma phenomenon, predicted in 1975 by Imry and Ma and rigorously established in 1989 by Aizen...
We present a simple strategy in order to show the existence and uniqueness of the infinite volume li...
In this paper the three-dimensional random-field Ising model is studied at both zero temperature and...
Despite decades of effort, our understanding of low-temperature phase of spin glass models with shor...
We study a three-dimensional plaquette spin model whose low temperature dynamics is glassy, due to l...