Numerical solution of moving boundary problems in diffusion processes with attractive and repulsive interactions

Two new numerical methods for the solution of stiff boundary valued or&nary differential equations are presented and compared The specific problem solved IS that of diffusion and reaction m a char pore, where eight species diffuse and react through ten free radical combustion reactions A new vanable

Three general methods are developed for solving moving-boundary problems which are governed by diffusional processes such as heat and mass transfer. Examples of such problems include melting, evaporation, and ablation. A method based upon a Riemann-Volterra integration of the diffusion equation lead

A three-dimensional melting and solidification problem is solved in which a second layer of solid is added at variable rates. The physical properties of the system are position and temperature dependent, and there is heat generation within the system. Each phase has a grid scheme where every grid po