Fractional Variable Order Derivative Simulink

Fractional Variable Order Derivative Simulink Toolkit. The toolkit is a set of Simulinks’ blocks for simulation of constant and variable fractional order derivatives according to the Grunwald-Letnikov definition. For implementation of variable order derivatives, four types of G-L definition extensions were used. Blocks are implemented as C-MEX S-functions.

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References in zbMATH (referenced in 8 articles )

Showing results 1 to 8 of 8.
Sorted by year (citations)

  1. Macias, Michal: The particular types of fractional variable-order symmetric operators (2020)
  2. Malesza, Wiktor; Sierociuk, Dominik: Duality properties of variable-type and -order differences (2019)
  3. Macias, Michał: Order composition properties for output-additive variable-order derivative (2017)
  4. Sakrajda, Piotr; Sierociuk, Dominik: Modeling heat transfer process in grid-holes structure changed in time using fractional variable order calculus (2017)
  5. Sierociuk, Dominik; Malesza, Wiktor; Macias, Michał: On the output-additive switching strategy for a new variable type and order difference (2017)
  6. Sierociuk, Dominik; Macias, Michal; Malesza, Wiktor; Sarwas, Grzegorz: Dual estimation of fractional variable order based on the unscented fractional order Kalman filter for direct and networked measurements (2016)
  7. Sierociuk, Dominik; Malesza, Wiktor; Macias, Michal: Derivation, interpretation, and analog modelling of fractional variable order derivative definition (2015)
  8. Sierociuk, Dominik; Malesza, Wiktor; Macias, Michal: On the recursive fractional variable-order derivative: equivalent switching strategy, duality, and analog modeling (2015)