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Non-Local Kinetics: Revisiting and Updates Emphasizing Fractional Calculus Applications

Jordan Hristov

2023Symmetry12 citationsDOIOpen Access PDF

Abstract

Non-local kinetic problems spanning a wide area of problems where fractional calculus is applicable have been analyzed. Classical fractional kinetics based on the Continuum Time Random Walk diffusion model with the absence of stationary states, real-world problems from pharmacokinetics, and modern material processing have been reviewed. Fractional allometry has been considered a potential area of application. The main focus in the analysis has been paid to the memory functions in the convolution formulation, crossing from the classical power law to versions of the Mittag-Leffler function. The main idea is to revisit the non-local kinetic problems with an update updating on new issues relevant to new trends in fractional calculus.

Topics & Concepts

Fractional calculusRandom walkCalculus (dental)Convolution (computer science)Applied mathematicsMathematicsFocus (optics)Time-scale calculusComputer scienceMultivariable calculusPhysicsStatisticsOpticsMachine learningControl engineeringArtificial neural networkDentistryEngineeringMedicineFractional Differential Equations Solutionsstochastic dynamics and bifurcation
Non-Local Kinetics: Revisiting and Updates Emphasizing Fractional Calculus Applications | Litcius