Propagating fronts in reaction–transport systems with memory

Abstract: In reaction-transport systems with non-standard diffusion, the memory of the transport causes a coupling of reactions and transport. We investigate the effect of this coupling for systems with Fisher-type kinetics and obtain a general analytical expression for the front speed. We apply our results to the specific case of subdiffusion.

“…Therefore, the standard technique of FourierLaplace transforms can be employed to reduce the two balance equations (29) and (30) to a single equation for ρ (x, t). It turns out that this equation can be written as a phenomenological balance equation (28). So Eq.…”

“…This equation is different from the analogous one in [3,28]. The propagation rate v can be found from [23] …”

“…We apply these models to the problem of propagating fronts in reaction-transport systems with non-standard diffusion [23,24] (see also a recent review [25]). The theory of subdiffusive propagation of a front is presented in [3,11,[26][27][28][29][30], the superdiffusive propagation is studied in [31].…”

Non-Markovian random walks and nonlinear reactions: Subdiffusion and propagating fronts

“…Therefore, the standard technique of FourierLaplace transforms can be employed to reduce the two balance equations (29) and (30) to a single equation for ρ (x, t). It turns out that this equation can be written as a phenomenological balance equation (28). So Eq.…”

“…This equation is different from the analogous one in [3,28]. The propagation rate v can be found from [23] …”

“…We apply these models to the problem of propagating fronts in reaction-transport systems with non-standard diffusion [23,24] (see also a recent review [25]). The theory of subdiffusive propagation of a front is presented in [3,11,[26][27][28][29][30], the superdiffusive propagation is studied in [31].…”

Non-Markovian random walks and nonlinear reactions: Subdiffusion and propagating fronts

“…The figure reveals a rich class of sub-diffusive behaviours to process. Equation (45) implies in an extensive class of behaviour associated with rate r of added and removed walkers. The problem presented in this subsection makes clear that the non-Gaussian solutions found in Sections 3.1 and 3.2 have an important degree of applicability.…”

“…The Montroll-Weiss equation has several consequences in temporal memory and non-local behaviour in transport system in disordered medium and complex system [42][43][44]. The appropriate choice for waiting time distribution describes systems such as integration-differential equation with chemical interaction [24,45,46], anomalous diffusion in expanding media [30] and diffusion of single metal atoms on a graphene oxide support [47].…”

Non-Gaussian Distributions to Random Walk in the Context of Memory Kernels

A new approach to abstract linear viscoelastic equation in Hilbert space