On the n-dimensional diffusion-controlled growth of precipitates in a finite matrix

Abstract: The diffusion-controlled n-dimensional growth (n = 1; 2; 3) in a finite matrix is considered solving the diffusion equation (DE) in the approximation of the stationary solution and having regard to the mass balance of the alloyed atoms. The results are compared with those obtained for the infinite matrix as well as for the non-stationary solutions of the DE. The derived results show that the method applied in this work is a useful approach to gaining information on the diffusion-controlled growth of precipitat… Show more

“…The indices i = 1, ... ,4 belong to the following methods. i = 1 : stationary solution of the diffusion equation by Wert and Zener[2], claiming the BC (5), but disregarding the mass balance; i = 2: stationary solution with regard to the mass balance according to Simmich and Loffler[7], but disregarding the RC (5) ; i = 3: non-stationary solution according to Zener [ 13 ; i = 4 : difference approximation according to the results 0. SIainircH Growth coefficients in dependence on the initial supersaturation Ac.…”

Description of Particle Growth by Means of a Difference Approximation

“…The indices i = 1, ... ,4 belong to the following methods. i = 1 : stationary solution of the diffusion equation by Wert and Zener[2], claiming the BC (5), but disregarding the mass balance; i = 2: stationary solution with regard to the mass balance according to Simmich and Loffler[7], but disregarding the RC (5) ; i = 3: non-stationary solution according to Zener [ 13 ; i = 4 : difference approximation according to the results 0. SIainircH Growth coefficients in dependence on the initial supersaturation Ac.…”

Description of Particle Growth by Means of a Difference Approximation

Theoretical Considerations on the Diffusion-Controlled Particle Growth in an Isotropic Medium

Influence of non-linear terms in the flux equation on the particle growth