Revisiting the derivation of the fractional diffusion equation
chapter
posted on 2023-06-08, 18:27authored byEnrico Scalas, R Gorenflo, F Mainardi, M Raberto
The fractional diffusion equation is derived from the master equation of continuous-time random walks (CTRWs) via a straightforward application of the Gnedenko-Kolmogorov limit theorem. The Cauchy problem for the fractional diffusion equation is solved in various important and general cases. The meaning of the proper diffusion limit for CTRWs is discussed.
Scaling and disordered systems: international workshop and collection of articles honoring Professor Antonio Coniglio on the occasion of his 60th birthday
Place of publication
London
ISBN
9789810248383
Department affiliated with
Mathematics Publications
Full text available
No
Peer reviewed?
Yes
Editors
Fereydoon Family, H Eugene Stanley, Hans J Herrmann, Mohamed Daoud