First Passage Times for Variable-Order Time-Fractional Diffusion

Abstract

We derive the asymptotic first passage time (FPT) distribution for space-dependent variable-order time-fractional diffusion, where the fractional exponent α(x) varies with position. For any sufficiently smooth α(x) on a finite domain with absorbing and reflecting boundaries, we show that the survival probability decays as (t) C\,t-α*/( t), where α* is the minimum value of the fractional exponent and is determined by the location and shape of the minimum. For a constant fractional exponent =0 and this provides a theoretical prediction that can identify spatially heterogeneous anomalous transport in experiments. We validate the theory against exact Laplace-space solutions and Monte Carlo simulations for linear and nonlinear profiles of α(x).