2022
DOI: 10.1088/1402-4896/ac5ff5
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Interesting and complex behaviour of Duffing equations within the frame of Caputo fractional operator

Abstract: The coupled system exemplifying the damped and driven oscillators (namely, Duffing equations) is examined with a familiar and robust numerical method. In the framework, we hired a reliable and most cited Caputo fractional operator to capture essential and stimulating behaviours of the hired physical model. The existence of the solution for the considered model is presented, and we captured the nature of the strange attractor for the Duffing equations with a period of the driving force. The effect of chaotic na… Show more

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Cited by 7 publications
(2 citation statements)
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“…The Duffing equation, as a nonlinear second-order differential equation, describes a damped oscillator's motion via a more complex potential compared to the one concerning simple harmonic motion, which aids with regard to the description of an oscillator that displays some times complex, at other times chaotic behavior. The manuscript examines the coupled system illustrating the damped and driven oscillators, which is to say Duffing equations with a familiar and robust numerical method [7]. For this purpose, the authors employ reliable Caputo fractional operator to be able to capture the essential behaviors of the physical model used.…”
Section: Work In Progressmentioning
confidence: 99%
“…The Duffing equation, as a nonlinear second-order differential equation, describes a damped oscillator's motion via a more complex potential compared to the one concerning simple harmonic motion, which aids with regard to the description of an oscillator that displays some times complex, at other times chaotic behavior. The manuscript examines the coupled system illustrating the damped and driven oscillators, which is to say Duffing equations with a familiar and robust numerical method [7]. For this purpose, the authors employ reliable Caputo fractional operator to be able to capture the essential behaviors of the physical model used.…”
Section: Work In Progressmentioning
confidence: 99%
“…which is a typical equation in nonlinear vibration systems, and serves as a paradigm of nonlinear dynamics. Many mathematical models of practical engineering nonlinear vibration problems can be transformed into this equation for study [43][44][45]. Specifically, we investigate the Duffing equation with amplitude modulation and without initial phase, expressed as…”
Section: Introductionmentioning
confidence: 99%