Asymptotic cycles in fractional maps of arbitrary positive orders
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Publication:2110182
DOI10.1007/s13540-021-00008-wzbMath1503.39003arXiv2111.12777OpenAlexW3214890831WikidataQ114017066 ScholiaQ114017066MaRDI QIDQ2110182
Avigayil B. Helman, Mark Edelman
Publication date: 21 December 2022
Published in: Fractional Calculus \& Applied Analysis (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/2111.12777
Fractional derivatives and integrals (26A33) Fixed points and periodic points of dynamical systems; fixed-point index theory; local dynamics (37C25) Difference equations, scaling ((q)-differences) (39A13) Fractional ordinary differential equations (34A08)
Cites Work
- Unnamed Item
- Unnamed Item
- Non-existence of periodic solutions in fractional-order dynamical systems and a remarkable difference between integer and fractional-order derivatives of periodic functions
- General fractional calculus, evolution equations, and renewal processes
- On the existence of periodic solutions in time-invariant fractional order systems
- Fractional standard map: Riemann-Liouville vs. Caputo
- Nonexistence of periodic solutions and asymptotically periodic solutions for fractional differential equations
- Fractional standard map
- A proof for non existence of periodic solutions in time invariant fractional order systems
- Periodic orbits as the skeleton of classical and quantum chaos
- Logistic map with memory from economic model
- On fractional derivatives and primitives of periodic functions
- The role of fractional calculus in modeling biological phenomena: a review
- Operational calculus for the general fractional derivative and its applications
- A new collection of real world applications of fractional calculus in science and engineering
- Comments on: ``Discrete fractional logistic map and its chaos
- Discrete fractional logistic map and its chaos
- Fractional Maps and Fractional Attractors. Part II: Fractional Difference Caputo α- Families of Maps
- Caputo standard α-family of maps: Fractional difference vs. fractional
- Applications in Physics, Part A
- Universal fractional map and cascade of bifurcations type attractors
- Chaotic and pseudochaotic attractors of perturbed fractional oscillator
- Fractional equations of kicked systems and discrete maps
- Discrete map with memory from fractional differential equation of arbitrary positive order
- On a New Definition of the Fractional Difference
- On stability of fixed points and chaos in fractional systems
- On the fractional Eulerian numbers and equivalence of maps with long term power-law memory (integral Volterra equations of the second kind) to Grünvald-Letnikov fractional difference (differential) equations
- Universality in Systems with Power-Law Memory and Fractional Dynamics
- Quasi-periodic solutions of fractional nabla difference systems
- Basic Theory
- Fractional Differential Equations
- New Types of Solutions of Non-linear Fractional Differential Equations
- Visibility graphs of fractional Wu–Baleanu time series
- Simple mathematical models with very complicated dynamics
- On Nonlinear Fractional Maps: Nonlinear Maps with Power-Law Memory
- Fractional Maps and Fractional Attractors. Part I: α-Families of Maps
- Discrete chaos in fractional sine and standard maps
- On fractional difference logistic maps: dynamic analysis and synchronous control
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