Search results for "Kinetic ising model"

showing 3 items of 3 documents

Phase separation in thin films: Effect of temperature gradients

2013

We study the phase-separation kinetics of a binary (AB) mixture confined in a thin film of thickness D with a temperature gradient. Starting from a Kawasaki-exchange kinetic Ising model, we use a master-equation approach to systematically derive an extension of the Cahn-Hilliard model for this system. We study the effect of temperature gradients perpendicular to the film with "neutral" (no preference for either A or B) surfaces. We highlight the rich phenomenology and pattern dynamics which arises from the interplay of phase separation and the temperature gradient.

Temperature gradientMaterials scienceOpticsChemical physicsbusiness.industryKineticsPerpendicularGeneral Physics and AstronomyKinetic ising modelThin filmbusinessPhenomenology (particle physics)EPL (Europhysics Letters)
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Kinetic-Ising-model description of Newtonian dynamics: A one-dimensional example.

1993

We show that the Newtonian dynamics of a chain of particles with an anharmonic on-site potential and harmonic nearest-neighbor interactions can be described by a one-dimensional kinetic Ising model with most general Glauber transition rates, provided the temperature is low enough compared to the minimum barrier height. The transition rates are calculated by use of the transition-state theory. At higher temperatures, memory effects occur which invalidate this kinetic description. These memory effects are due to the appearance of dynamically correlated clusters of particles performing periodic oscillations over a certain time scale.

PhysicsScale (ratio)AnharmonicityRelaxation (physics)Kinetic ising modelHarmonic (mathematics)Statistical physicsKinetic energyGlauberNewtonian dynamicsPhysical review. E, Statistical physics, plasmas, fluids, and related interdisciplinary topics
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Surface-directed spinodal decomposition: Lattice model versus Ginzburg-Landau theory

2009

When a binary mixture is quenched into the unstable region of the phase diagram, phase separation starts by spontaneous growth of long-wavelength concentration fluctuations ("spinodal decomposition"). In the presence of surfaces, the latter provide nontrivial boundary conditions for this growth. These boundary conditions can be derived from lattice models by suitable continuum approximations. But the lattice models can also be simulated directly, and thus used to clarify the conditions under which the Ginzburg–Landau type theory is valid. This comparison shows that the latter is accurate only in the immediate vicinity of the bulk critical point, if thermal fluctuations can also be neglecte…

PhysicsSpinodalwettingCondensed matter physicsSpinodal decompositionBinary mixturesThermal fluctuationsStatistical and Nonlinear PhysicsCondensed Matter PhysicsKawasaki kinetic Ising modelCritical point (thermodynamics)Lattice (order)computer simulationGinzburg–Landau theoryBoundary value problemStatistical physicsphase separationPhase diagram
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