Litcius/Paper detail

Fractional Order Models Are Doubly Infinite Dimensional Models and thus of Infinite Memory: Consequences on Initialization and Some Solutions

Jocelyn Sabatier

2021Symmetry20 citationsDOIOpen Access PDF

Abstract

Using a small number of mathematical transformations, this article examines the nature of fractional models described by fractional differential equations or pseudo state space descriptions. Computation of the impulse response of a fractional model using the Cauchy method shows that they exhibit infinitely small and high time constants. This impulse response can be rewritten as a diffusive representation whose Fourier transform permits a representation of a fractional model by a diffusion equation in an infinite space domain. Fractional models can thus be viewed as doubly infinite dimensional models: infinite as distributed with a distribution in an infinite domain. This infinite domain or the infinitely large time constants of the impulse response reveal a property intrinsic to fractional models: their infinite memory. Solutions to generate fractional behaviors without infinite memory are finally proposed.

Topics & Concepts

Fractional calculusImpulse responseMathematicsImpulse (physics)Cauchy distributionInitializationDomain (mathematical analysis)Mathematical analysisRepresentation (politics)Applied mathematicsComputer sciencePhysicsQuantum mechanicsProgramming languagePolitical sciencePoliticsLawFractional Differential Equations SolutionsAdvanced Control Systems DesignMathematical functions and polynomials
Fractional Order Models Are Doubly Infinite Dimensional Models and thus of Infinite Memory: Consequences on Initialization and Some Solutions | Litcius