Existence and Uniqueness of Positive and Bounded Solutions of a Discrete Population Model with Fractional Dynamics

Abstract: We depart from the well-known one-dimensional Fisher’s equation from population dynamics and consider an extension of this model using Riesz fractional derivatives in space. Positive and bounded initial-boundary data are imposed on a closed and bounded domain, and a fully discrete form of this fractional initial-boundary-value problem is provided next using fractional centered differences. The fully discrete population model is implicit and linear, so a convenient vector representation is readily derived. Unde… Show more

“…For one-dimensional version of Fisher-type equation and its solution methods, see [8,20,23,41] and the cited works therein. For existence and uniqueness results, see [13,16,29,34]; while for some special exact (travelling wave) solutions under special circumstances, see [1,22,35,42].…”

Stable meshless discretization of two-dimensional Fisher-type equations by local multiquadric method over non-rectangular domains

“…For one-dimensional version of Fisher-type equation and its solution methods, see [8,20,23,41] and the cited works therein. For existence and uniqueness results, see [13,16,29,34]; while for some special exact (travelling wave) solutions under special circumstances, see [1,22,35,42].…”

Stable meshless discretization of two-dimensional Fisher-type equations by local multiquadric method over non-rectangular domains

Mathematical analysis and numerical simulations for the HSP70 synthesis model

A dynamically consistent exponential scheme to solve some advection–reaction equations with Riesz anomalous diffusion