Chaotic Attractors with Fractional Conformable Derivatives in the Liouville–Caputo Sense and Its Dynamical Behaviors

Abstract: This paper deals with a numerical simulation of fractional conformable attractors of type Rabinovich-Fabrikant, Thomas' cyclically symmetric attractor and Newton-Leipnik. Fractional conformable and β-conformable derivatives of Liouville-Caputo type are considered to solve the proposed systems. A numerical method based on the Adams-Moulton algorithm is employed to approximate the numerical simulations of the fractional-order conformable attractors. The results of the new type of fractional conformable and β-con… Show more

“…Fractional differential equations (FDEs) are among the strongest tools of mathematical modeling and are successfully employed to model complex physical and biological phenomena like anomalous diffusion, viscoelastic behavior, power laws, and automatic remote control systems. In the available literature, notable definitions of fractional derivatives were given by famous mathematicians, but the most commonly used are the Riemann-Liouville (RL) and Caputo derivatives [1,2,21,22,24,26,29,39]. Thus FDEs involving the RL fractional derivative or Caputo derivative have considered frequently for investigating the existence of mild solutions.…”

Existence of mild solutions for impulsive neutral Hilfer fractional evolution equations

“…Fractional differential equations (FDEs) are among the strongest tools of mathematical modeling and are successfully employed to model complex physical and biological phenomena like anomalous diffusion, viscoelastic behavior, power laws, and automatic remote control systems. In the available literature, notable definitions of fractional derivatives were given by famous mathematicians, but the most commonly used are the Riemann-Liouville (RL) and Caputo derivatives [1,2,21,22,24,26,29,39]. Thus FDEs involving the RL fractional derivative or Caputo derivative have considered frequently for investigating the existence of mild solutions.…”

Existence of mild solutions for impulsive neutral Hilfer fractional evolution equations

“…Nowadays, the fractional differential equations (FDEs) have gained increased appearances in varied problems in various fields of physics, chemistry, biology, applied science and engineering, this is due to their accuracy in modelling these problems [1][2][3][4][5][6][7][8]. Consequently, the development of analytical and numerical algorithms for FDEs is an interested topic for many researches [9][10][11][12][13][14][15][16].…”

Numerical study on factional differential-algebraic systems by means of Chebyshev Pseudo spectral method

“…The conformable derivative can be regarded as a natural extension of the classical differential operator, which satisfies most important properties, such as the chain rule [29][30][31]. Researchers have recently applied conformable derivatives to many scientific fields [32][33][34][35][36][37][38][39][40][41][42].…”

Modeling, discretization, and hyperchaos detection of conformable derivative approach to a financial system with market confidence and ethics risk