Subdiffusion--absorption process in a system consisting of two different media

Abstract

Subdiffusion with reaction A+B→ B is considered in a system which consists of two homogeneous media joined together; the A particles are mobile whereas B are static. Subdiffusion and reaction parameters, which are assumed to be independent of time and space variable, can be different in both media. Particles A move freely across the border between the media. In each part of the system the process is described by the subdiffusion--reaction equations with fractional time derivative. By means of the method presented in this paper we derive both the fundamental solutions (the Green's functions) P(x,t) to the subdiffusion--reaction equations and the boundary conditions at the border between the media. One of the conditions demands the continuity of a flux and the other one contains the Riemann--Liouville fractional time derivatives ∂α1P(0+,t)/∂ tα1=(D1/D2)∂α2P(0-,t)/∂ tα2, where the subdiffusion parameters α1, D1 and α2, D2 are defined in the regions x<0 and x>0, respectively.