Space-Time Duality and High-Order Fractional Diffusion
Abstract
Super-diffusion, characterized by a spreading rate of the probability density function , where is time, may be modeled by space-fractional diffusion equations with order . Some applications in biophysics (calcium spark diffusion), image processing, and computational fluid dynamics utilize integer-order and fractional-order exponents beyond than this range (), known as high-order diffusion, or hyperdiffusion. Recently, space-time duality, motivated by Zolotarev's duality law for stable densities, established a link between time-fractional and space-fractional diffusion for . This paper extends space-time duality to fractional exponents , and several applications are presented. In particular, it will be shown that space-fractional diffusion equations with order model sub-diffusion and have a stochastic interpretation. A space-time duality for tempered fractional equations, which models transient anomalous diffusion, is also developed.
Cite
@article{arxiv.1808.01061,
title = {Space-Time Duality and High-Order Fractional Diffusion},
author = {James F. Kelly and Mark M. Meerschaert},
journal= {arXiv preprint arXiv:1808.01061},
year = {2019}
}
Comments
3 figures, Physical Review E