The explicit formula for solution of anomalous diffusion equation in the multi-dimensional space

Abstract

This paper intends on obtaining the explicit solution of n-dimensional anomalous diffusion equation in the infinite domain with non-zero initial condition and vanishing condition at infinity. It is shown that this equation can be derived from the parabolic integro-differential equation with memory in which the kernel is t-αE1-α, 1-α(-t1-α),α∈(0, 1), where Eα, β is the Mittag-Liffler function. Based on Laplace and Fourier transforms the properties of the Fox H-function and convolution theorem, explicit solution for anomalous diffusion equation is obtained.