Examples of 'ising model' in a sentence
Meaning of "ising model"
The 'Ising model' is a mathematical model in statistical physics, named after Ernst Ising. It represents a simplified system of interacting spins (magnetic moments) on a lattice. The model is used to study the behavior of physical systems, such as the behavior of magnets and ferromagnetic materials. It has applications in various fields, including condensed matter physics, statistical mechanics, and computer science
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- A particular mathematical model of ferromagnetism in statistical mechanics.
How to use "ising model" in a sentence
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ising model
Ising model is one of the simplest approximation of such pairwise interaction.
This type of system is called a microcanonical Ising model.
Some ising model related results for subshifts of finite type.
An example of a model for such a field is the Ising model.
And to the Ising model of spins on a lattice.
He also established conformality for the Ising model in two dimensions.
He also established what are now known as Lebowitz inequalities for the ferromagnetic Ising model.
The classical approaches are based on the Ising model and one the renormalisation group.
He also had made contributions to ferromagnetic theory via the Ising model.
Starting from the Ising model and repeating this iteration eventually changes all the couplings.
The general formulas are illustrated for the perpendicular susceptibilities of the Ising model.
The Ising model theory of Landau first raised the order parameter to prominence.
Example applications of multiple SLEs include crossing probabilities for percolation and Ising model.
This motivates the reason for the Ising model to be simulated using Monte Carlo methods.
This was first established by Rudolf Peierls in the Ising model.
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Here, we apply the technique to the ising model defined on a square lattice.
In this master thesis we present some classical results relative to the one-dimensional ising model.
Above the critical temperature, the ising model is disordered.
It is an Ising model with long range frustrated ferro - as well as antiferromagnetic couplings.
These 3 representations are related to the Ising model.
The case q 2 corresponds to the ising model to which an exact solution does exist.
First, we will study a system described by a generalized Ising model.
One-dimensional inhomogeneous Ising model with periodic boundary conditions.
These 6 representations are related to the tri critical Ising model.
The 2D Ising model was the first model to exhibit a continuous phase transition at a positive temperature.
In particular, lozenge tilings correspond to three dimensional Ising model at zero temperature.
The Ising model on a two-dimensional square lattice with no magnetic field was analytically solved by.
Last, we address the problem of symmetries in the Ising model on random maps.
We use the 2D Ising model to test and quantify this proposition.
In particular, Samuel uncovered a particularly simple way to solve the two-dimensional Ising model.
The transition kinetics is modelled by Ising model on triangle lattice, with kinetic Monte-Carlo method.
February - Lars Onsager publishes the exact solution to the two-dimensional Ising model.
Examples include the 2d critical Ising model and the more general 2d critical Potts model.
Ernst Ising, physicist who developed Ising model.
For instance, in 3 dimensions the Ising model is dual to an Ising gauge model.
A 5x5 representational grid of an Ising model.
Specifically for the Ising model and using single-spin-flip dynamics, one can establish the following.
Abstract, The 2-matrix model has been introduced to study Ising model on random surfaces.
A key example is the Ising model on a graph Γ { \ displaystyle \ Gamma.
The critical point of the 2D Ising model.
Consider the Ising model on a d { \ displaystyle d } - dimensional lattice.
Some examples include the Bethe ansatz, square-lattice Ising model in zero field, hard hexagon model.
Contains a detailed pedagogical discussion of Onsager 's solution of the 2-D Ising Model.
When q ≤ 4 a continuous transition is observed, as in the Ising model where q 2.
Nucleation at a surface ( black ) in the 2D Ising model.
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