Title of article
Mathematical model on surface reaction diffusion in the presence of front chemical reaction
Author/Authors
D.V. Permikin، نويسنده , , V.S. Zverev، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2013
Pages
7
From page
215
To page
221
Abstract
The article discusses a mathematical model of solid-phase diffusion over substance surface accompanied a frontal chemical reaction. The purpose of our article is to describe the concentration distribution and surface reacted layer growth. The model is a system parabolic equations, complicated with the presence of mobile front. It takes account of diffusive fluxes redistribution, sublimation from the surface, chemical reaction reversibility. The asymptotic approximation of the obtained nonlinear problem is constructed. Numerical solution was also carried out. Both numerical and analytical solutions conform to each other in a wide range of parameter changes, whereas observed differences are explained. It was obtained that the reaction front at the substrate surface grows as the fourth root of time in the assumed absence of evaporation and reaction reversibility. In the presence of evaporation the logarithmic distribution law ln(t) is obtained. The theoretical possibility of sharp deceleration and stop of reaction product layer growth is obtained.
Keywords
Surface reaction diffusion , Unknown moving boundary , System of nonlinear parabolic equations , Asymptotic and numeric solution
Journal title
INTERNATIONAL JOURNAL OF HEAT AND MASS TRANSFER
Serial Year
2013
Journal title
INTERNATIONAL JOURNAL OF HEAT AND MASS TRANSFER
Record number
1078507
Link To Document