Two New Approximations for Variable-Order Fractional Derivatives

Two New Approximations for Variable-Order Fractional Derivatives

We introduced a parameter σ(t) which was related to α(t); then two numerical schemes for variable-order Caputo fractional derivatives were derived; the second-order numerical approximation to variable-order fractional derivatives α(t)∈(0,1) and 3-α(t)-order approximation for α(t)∈(1,2) are establish...

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Veröffentlicht in:Discrete dynamics in nature and society 2017-01, Vol.2017 (2017), p.1-10
Hauptverfasser: Du, Ruilian, Liang, Zongqi
Format: Artikel
Sprache:eng
Schlagworte:
Algorithms
Applied mathematics
Approximation
Approximation theory
Calculus, Differential
Computational physics
Derivatives
Exact solutions
Mathematical research
Mechanics
Numerical analysis
Viscoelasticity
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Beschreibung
Zusammenfassung:We introduced a parameter σ(t) which was related to α(t); then two numerical schemes for variable-order Caputo fractional derivatives were derived; the second-order numerical approximation to variable-order fractional derivatives α(t)∈(0,1) and 3-α(t)-order approximation for α(t)∈(1,2) are established. For the given parameter σ(t), the error estimations of formulas were proven, which were higher than some recently derived schemes. Finally, some numerical examples with exact solutions were studied to demonstrate the theoretical analysis and verify the efficiency of the proposed methods.
ISSN:1026-0226
1607-887X
DOI:10.1155/2017/1586249