R. Hilfer
Published 2000-05-30Version 1
Time evolutions whose infinitesimal generator is a fractional time derivative arise generally in the long time limit. Such fractional time evolutions are considered here for random walks. An exact relationship is given between the fractional master equation and a separable continuous time random walk of the Montroll-Weiss type. The waiting time density can be expressed using a generalized Mittag-Leffler function. The first moment of the waiting density does not exist.
Comments: 10 pages, Latex
Journal: Lecture Notes in Physics, vol. 519, pages 77-82, Springer, Berlin 1999
Long time limit of equilibrium glassy dynamics and replica calculation
Nonequilibrium coupled Brownian phase oscillators
Fractional diffusion on a fractal grid comb
