Continuous time random walks and the Cauchy problem for the heat equation

Abstract

In this paper we deal with anomalous diffusions induced by Continuous Time Random Walks - CTRW in Rn. A particle moves in Rn in such a way that the probability density function u(·,t) of finding it in region of Rn is given by ∫u(x,t) dx. The dynamics of the diffusion is provided by a space time probability density J(x,t) compactly supported in \t≥ 0\. For t large enough, u must satisfy the equation u(x,t)=[(J-δ) u](x,t) where δ is the Dirac delta in space time. We give a sense to a Cauchy type problem for a given initial density distribution f. We use Banach fixed point method to solve it, and we prove that under parabolic rescaling of J the equation tends weakly to the heat equation and that for particular kernels J the solutions tend to the corresponding temperatures when the scaling parameter approaches to zero.