Analytic approaches of the anomalous diffusion: A review

Abstract: This review article aims to stress and reunite some of the analytic formalism of the anomalous diffusive processes that have succeeded in their description. Also, it has the objective to discuss which of the new directions they have taken nowadays. The discussion is started by a brief historical report that starts with the studies of thermal machines and combines in theories such as the statistical mechanics of Boltzmann-Gibbs and the Brownian Movement. In this scenario, in the twentieth century, a series of e… Show more

“…In this way, the prediction of the walker in the next position may not only want local knowledge of walker but also of positions in earlier times. Thereby, the system has a dependence of past history, and reveals that the non-Markovian process can be described by use of CTRW theory [13,16]. Now, using the CTRW theory, we want to build a fractional diffusion equation that is associated with generalized Lévy process.…”

“…Among them, in super-statistical [1][2][3], diffusion with memory kernels [4][5][6], stochastic resetting process [7,8], controlled-diffusion [9][10][11], complex fluids [12], etc. In this scenario, a huge quantity of systems present a relation between a non-Gaussian distribution and anomalous diffusion process by nonlinear growth of the mean square displacement (MSD) in time [13,14], i.e., (∆x) 2 = 2K α t α , in which K α is a general diffusion coefficient with fractional dimension. The MSD relation is associated with different diffusive behaviors, classified as follows: 0 < α < 1, the system is sub-diffusive; α = 1 usual diffusion; and 1 < α < 2 occurs the super-diffusion.…”

“…Hence, investigate the mechanisms which lead to anomalous process and non-Gaussian distributions are central themes in mathematical of diffusion. In particular, the Lévy process (in Riesz-Feller sense [13]) can be determined through analytical calculus of probability distribution in CTRW approach, and applications for it is present in many fields of physics [17]. In this direction, the present work investigates how memory kernel modifies the Lévy process.…”

Mittag–Leffler Memory Kernel in Lévy Flights

“…In this way, the prediction of the walker in the next position may not only want local knowledge of walker but also of positions in earlier times. Thereby, the system has a dependence of past history, and reveals that the non-Markovian process can be described by use of CTRW theory [13,16]. Now, using the CTRW theory, we want to build a fractional diffusion equation that is associated with generalized Lévy process.…”

“…Among them, in super-statistical [1][2][3], diffusion with memory kernels [4][5][6], stochastic resetting process [7,8], controlled-diffusion [9][10][11], complex fluids [12], etc. In this scenario, a huge quantity of systems present a relation between a non-Gaussian distribution and anomalous diffusion process by nonlinear growth of the mean square displacement (MSD) in time [13,14], i.e., (∆x) 2 = 2K α t α , in which K α is a general diffusion coefficient with fractional dimension. The MSD relation is associated with different diffusive behaviors, classified as follows: 0 < α < 1, the system is sub-diffusive; α = 1 usual diffusion; and 1 < α < 2 occurs the super-diffusion.…”

“…Hence, investigate the mechanisms which lead to anomalous process and non-Gaussian distributions are central themes in mathematical of diffusion. In particular, the Lévy process (in Riesz-Feller sense [13]) can be determined through analytical calculus of probability distribution in CTRW approach, and applications for it is present in many fields of physics [17]. In this direction, the present work investigates how memory kernel modifies the Lévy process.…”

Mittag–Leffler Memory Kernel in Lévy Flights

“…However, because of the initial conditions (43) and (44), the cases 0 < α ≤ 1 2 and 1 2 < α ≤ 1 can be written in the same form, as in eq. (46).…”

“…On the other hand, deviations from the standard diffusive behaviour are known to occur in many situations [3,44,47]. Among the different models of anomalous behaviour, an interesting one is provided by the use of fractional differential equations (FDE) [11].…”

Spectral Analysis of Fractional Hyperbolic Diffusion Equations with Random Data

Fractional Diffusion and Fokker-Planck Equations