Examples of 'mean-field' in a sentence
Meaning of "mean-field"
mean-field (noun) - A concept in physics and mathematics referring to a method of approximating interactions between elements in a system
How to use "mean-field" in a sentence
Basic
Advanced
mean-field
This mechanism is used in a mean-field microkinetics model.
Mean-field methods are commonly used to analyse the phases.
This problem is formulated as a mean-field type differential game.
A quantum mean-field theory of the pyrochlore lattice is presented.
We compute also finite temperature results in mean-field approximation.
The mean-field approximation consists of neglecting this second order fluctuation term.
The problem is treated by adapting the correlated cluster mean-field theory.
Dynamical mean-field theory studies of superfluidity and topological phases in lattice models.
The experimental data were used to identify a mean-field crystal viscoplasticity model.
Using the mean-field approximation, a model based on a local structural distortion reproduces quite well our measurements.
The interactions on the systems are considered at the mean-field level.
It took several years before a mean-field theory of spin glasses was solved and understood.
This force gives excellent results in nucleiat the mean-field approximation.
The model is treated within a local mean-field theory, which defines a grand potentiel landscape.
Local numerical modelling of magnetoconvection and turbulence, implications for mean-field theories.
See also
In particular, a general method to compute the mean-field phase diagram of this model is described.
The interactions between the electrons are described within the mean-field theory.
The study took into account simple mean-field approximations and monte carlo simulations.
Thus, the partition function may be constructed analytically making use of mean-field approximation.
Our studies showed that the heterogeneous mean-field theory describes the contact process on complex networks.
DYNVIB generated the first ever whole brain mean-field model.
For each topic, a mean-field or Landau theory is presented to describe qualitatively the phase transitions.
A numerical comparison between the exact and the mean-field solutions is conducted.
A mean-field approach to study the clustering coefficient was applied by Fronczak, Fronczak and Holyst.
In the present dissertation three aspects of mean-field theories and models of stars are studied.
The dynamics of Landau 's theory is defined by a kinetic equation of the mean-field type.
The axisymmetric magnetic field produced by the mean-field dynamo model exhibits two distincts dynamo modes.
Abstract, A nucleus is described as a set of independent neutrons and protons linked by a mean-field potential.
The crystal Hamiltonian is written down and the mean-field approximation is briefly discussed.
Mean-field approximation is applied and the energy-momentum tensor is obtained.
The majority of the research is conducted by solving the mean-field Gross-Pitaevskii and Bogoliubov equations.
These results permit to develop, in the second part, an approximationcalled quantum mean-field.
In order to describe the condensate, a mean-field theory is first adopted.
A mean-field approximation, written in terms of ordinary differential equations, is also proposed and analyzed.
We describe our observations with a steady-state mean-field analysis.
Workshop " Recent developments in mean-field game, machine learning and quantitative finance ".
In particular, the transverse direction is not predicted by mean-field models.
Dynamical mean-field theory ( DMFT ) is a method to determine the electronic structure of strongly correlated materials.
Thus the Erdős-Rényi process is the mean-field case of percolation.
Within a Gutzwiller mean-field approach, we determine the steady-state phase diagram of the system.
As a first step, we treat the model within the mean-field approximation.
Mean-field studies of spin-imbalanced attractive Hubbard model in 1D and 2D quasicrystals.
Chapter five connects the self-stabilizing process and some mean-field systems.
In one part, we chood to work at the mean-field level in the Hartree -- Fock scheme.
Subsequently, we investigate sufficient conditions for the Lipschitz-in-space regularity of mean-field optimal control.
The majority of the research involves numerically solving the mean-field Gross-Pitaevskii equation for a spin-1 condensate.
The mathematical concept of ‘ Inverse Problem ' is applied to a realistic mean-field Hamiltonian.
We use analytical and numerical techniques within mean-field ( so-called Poisson-Nernst-Planck formalism ).
Next, we solve the problem in the mean-field.
