Modelling chaotic dynamical attractor with fractal-fractional differential operators

Sonal Jain, Youssef El-Khatib

Research output: Contribution to journalArticlepeer-review

4 Citations (Scopus)


Differential operators based on convolution have been recognized as powerful mathematical operators able to depict and capture chaotic behaviors, especially those that are not able to be depicted using classical differential and integral operators. While these differential operators have being applied with great success in many fields of science, especially in the case of dynamical system, we have to confess that they were not able depict some chaotic behaviors, especially those with additionally similar patterns. To solve this issue new class of differential and integral operators were proposed and applied in few problems. In this paper, we aim to depict chaotic behavior using the newly defined differential and integral operators with fractional order and fractal dimension. Additionally we introduced a new chaotic operators with strange attractors. Several simulations have been conducted and illustrations of the results are provided to show the efficiency of the models.

Original languageEnglish
Pages (from-to)13689-13725
Number of pages37
JournalAIMS Mathematics
Issue number12
Publication statusPublished - 2021


  • AS strange attractor
  • Chaotic attractors
  • Fractal-fractional differential operators
  • Fractal-fractional integral operator

ASJC Scopus subject areas

  • General Mathematics


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