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- Title
Fractional Grassi–Miller Map Based on the Caputo h-Difference Operator: Linear Methods for Chaos Control and Synchronization.
- Authors
Talbi, Ibtissem; Ouannas, Adel; Grassi, Giuseppe; Khennaoui, Amina-Aicha; Pham, Viet-Thanh; Baleanu, Dumitru
- Abstract
Investigating dynamic properties of discrete chaotic systems with fractional order has been receiving much attention recently. This paper provides a contribution to the topic by presenting a novel version of the fractional Grassi–Miller map, along with improved schemes for controlling and synchronizing its dynamics. By exploiting the Caputo h-difference operator, at first, the chaotic dynamics of the map are analyzed via bifurcation diagrams and phase plots. Then, a novel theorem is proved in order to stabilize the dynamics of the map at the origin by linear control laws. Additionally, two chaotic fractional Grassi–Miller maps are synchronized via linear controllers by utilizing a novel theorem based on a suitable Lyapunov function. Finally, simulation results are reported to show the effectiveness of the approach developed herein.
- Subjects
LINEAR operators; CHAOS synchronization; DISCRETE systems; LYAPUNOV functions; CHARTS, diagrams, etc.; POLYNOMIAL chaos; BIFURCATION diagrams
- Publication
Discrete Dynamics in Nature & Society, 2020, p1
- ISSN
1026-0226
- Publication type
Article
- DOI
10.1155/2020/8825694