0000000000671345

AUTHOR

M. Niemiec

showing 3 related works from this author

Phase transformation kinetics in d-dimensional grains-containing systems: diffusion-type model

1998

Abstract An analytical approach to the phase transformation in d-dimensional grains-containing complex systems is offered. It is based on considering the mechanism of surface material exchange among neighbouring grains as the so-called state-dependent diffusion process, where the diffusion function is related to the magnitude of the grain boundary. The approach proposed deals with the kinetics of that ensemble under circumstances of a volume increase of the new phase or microstructure. Probabilistic characteristics of the process are derived and analyzed. A comparison with 2D modelling of similar kind is presented for the 3D case, and some possible practical realizations of the situation un…

Statistics and ProbabilityGrain growthMaterials scienceTransformation (function)Diffusion processPhase (matter)Complex systemThermodynamicsGrain boundary diffusion coefficientGrain boundaryDiffusion (business)Condensed Matter PhysicsPhysica A: Statistical Mechanics and its Applications
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Kinetics of growth process controlled by convective fluctuations

2001

A model of the spherical (compact) growth process controlled by a fluctuating local convective velocity field of the fluid particles is introduced. It is assumed that the particle velocity fluctuations are purely noisy, Gaussian, of zero mean, and of various correlations: Dirac delta, exponential, and algebraic (power law). It is shown that for a large class of the velocity fluctuations, the long-time asymptotics of the growth kinetics is universal (i.e., it does not depend on the details of the statistics of fluctuations) and displays the power-law time dependence with the classical exponent $1/2$ resembling the diffusion limited growth. For very slow decay of algebraic correlations of flu…

Physicssymbols.namesakeField (physics)Quantum mechanicsExponentsymbolsDirac delta functionRadiusAlgebraic numberDiffusion (business)Power lawExponential functionMathematical physicsPhysical Review E
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KINETICS OF CRYSTAL GROWTH LIMITED BY RANDOM VELOCITY FIELDS

2008

A spherical growth process controlled by velocity fluctuations of particles of a saturated solution is investigated. Velocity fluctuations are modeled by a Gaussian random field. The interface evolution is determined by a Langevin-type equation with a multiplicative random field, which in the case of the quasi-homogeneous random Gaussian field is equivalent to Fokker–Planck dynamics. We analyze numerically the Fokker–Planck equation and compare growth kinetics in the case of noisy (i.e. space-independent) fluctuations. It is shown that for a large class of spatially correlated velocity fluctuations, the growth kinetics is universal, i.e. it does not depend on the details of statistics of f…

PhysicsRandom fieldField (physics)Applied MathematicsGaussianKineticsDynamics (mechanics)Multiplicative functionGaussian random fieldsymbols.namesakeFlow velocityModeling and SimulationsymbolsStatistical physicsEngineering (miscellaneous)International Journal of Bifurcation and Chaos
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