Solvable continuous-time random walk model of the motion of tracer particles through porous media

We consider the continuous-time random walk (CTRW) model of tracer motion in porous medium flows based on the experimentally determined distributions of pore velocity and pore size reported by Holzner et al. [M. Holzner et al., Phys. Rev. E 92, 013015 (2015)]. The particle's passing through one channel is modeled as one step of the walk. The step (channel) length is random and the walker's velocity at consecutive steps of the walk is conserved with finite probability, mimicking that at the turning point there could be no abrupt change of velocity. We provide the Laplace transform of the characteristic function of the walker's position and reductions for different cases of independence of the CTRW's step duration tau, length l, and velocity upsilon. We solve our model with independent l and upsilon. The model incorporates different forms of the tail of the probability density of small velocities that vary with the model parameter alpha. Depending on that parameter, all types of anomalous diffusion can hold, from super- to subdiffusion. In a finite interval of alpha, ballistic behavior with logarithmic corrections holds, which was observed in a previously introduced CTRW model with independent l and tau. Universality of tracer diffusion in the porous medium is considered.