Mboupda Pone et al., 2019 - Google Patents
Period-doubling route to chaos, bistability and antimononicity in a jerk circuit with quintic nonlinearityMboupda Pone et al., 2019
- Document ID
- 10683326774307192460
- Author
- Mboupda Pone J
- Kamdoum Tamba V
- Kom G
- Tiedeu A
- Publication year
- Publication venue
- International Journal of Dynamics and Control
External Links
Snippet
In this paper, the dynamics of an autonomous jerk circuit with quintic nonlinearity is investigated. The circuit is described by a set of three coupled-first order nonlinear differential equations recently introduced as memory oscillator by Sprott (Elegant chaos …
- 230000036461 convulsion 0 title abstract description 38
Classifications
-
- G—PHYSICS
- G06—COMPUTING; CALCULATING; COUNTING
- G06F—ELECTRICAL DIGITAL DATA PROCESSING
- G06F7/00—Methods or arrangements for processing data by operating upon the order or content of the data handled
- G06F7/60—Methods or arrangements for performing computations using a digital non-denominational number representation, i.e. number representation without radix; Computing devices using combinations of denominational and non-denominational quantity representations, e.g. using difunction pulse trains, STEELE computers, phase computers
- G06F7/68—Methods or arrangements for performing computations using a digital non-denominational number representation, i.e. number representation without radix; Computing devices using combinations of denominational and non-denominational quantity representations, e.g. using difunction pulse trains, STEELE computers, phase computers using pulse rate multipliers or dividers pulse rate multipliers or dividers per se
-
- G—PHYSICS
- G06—COMPUTING; CALCULATING; COUNTING
- G06G—ANALOGUE COMPUTERS
- G06G7/00—Devices in which the computing operation is performed by varying electric or magnetic quantities
- G06G7/12—Arrangements for performing computing operations, e.g. operational amplifiers
- G06G7/16—Arrangements for performing computing operations, e.g. operational amplifiers for multiplication or division
-
- G—PHYSICS
- G06—COMPUTING; CALCULATING; COUNTING
- G06F—ELECTRICAL DIGITAL DATA PROCESSING
- G06F17/00—Digital computing or data processing equipment or methods, specially adapted for specific functions
- G06F17/10—Complex mathematical operations
Similar Documents
| Publication | Publication Date | Title |
|---|---|---|
| Mboupda Pone et al. | Period-doubling route to chaos, bistability and antimononicity in a jerk circuit with quintic nonlinearity | |
| Kengne et al. | Nonlinear behavior of a novel chaotic jerk system: antimonotonicity, crises, and multiple coexisting attractors | |
| Kengne et al. | Antimonotonicity, chaos and multiple attractors in a novel autonomous memristor-based jerk circuit | |
| Kengne et al. | Coexistence of multiple attractors and crisis route to chaos in autonomous third order Duffing–Holmes type chaotic oscillators | |
| Biswas et al. | A simple chaotic and hyperchaotic time-delay system: design and electronic circuit implementation | |
| Kengne et al. | Dynamical analysis of a simple autonomous jerk system with multiple attractors | |
| Kengne et al. | Periodicity, chaos, and multiple attractors in a memristor-based Shinriki's circuit | |
| Cang et al. | Four-dimensional autonomous dynamical systems with conservative flows: two-case study | |
| Qi et al. | On a four-dimensional chaotic system | |
| Beléndez et al. | Exact solution for the unforced Duffing oscillator with cubic and quintic nonlinearities | |
| Kengne et al. | Dynamic analysis of a novel jerk system with composite tanh-cubic nonlinearity: chaos, multi-scroll, and multiple coexisting attractors | |
| Singh et al. | On Painlevé analysis, symmetry group and conservation laws of Date–Jimbo–Kashiwara–Miwa equation | |
| Kengne et al. | Dynamical analysis of a novel single Opamp-based autonomous LC oscillator: antimonotonicity, chaos, and multiple attractors | |
| Signing et al. | Coexistence of hidden attractors, 2-torus and 3-torus in a new simple 4-D chaotic system with hyperbolic cosine nonlinearity | |
| Kengne et al. | On the analysis of semiconductor diode-based chaotic and hyperchaotic generators—a case study | |
| Chou et al. | Computational method for the quantum Hamilton-Jacobi equation: Bound states in one dimension | |
| Kengne et al. | The effects of symmetry breaking on the dynamics of a simple autonomous jerk circuit | |
| Kamdjeu Kengne et al. | Dynamics, control and symmetry breaking aspects of a modified van der Pol–Duffing oscillator, and its analog circuit implementation | |
| Leutcho et al. | Symmetry-breaking, amplitude control and constant Lyapunov exponent based on single parameter snap flows | |
| Ngamsa Tegnitsap et al. | Dynamical study of VDPCL oscillator: antimonotonicity, bursting oscillations, coexisting attractors and hardware experiments | |
| Dong et al. | A memristor-based chaotic oscillator for weak signal detection and its circuitry realization | |
| Wang et al. | Hidden dynamics, synchronization, and circuit implementation of a fractional-order memristor-based chaotic system | |
| Palit et al. | Comparative study of homotopy analysis and renormalization group methods on Rayleigh and Van der Pol equations | |
| Wang et al. | An improved Hénon map based on GL fractional-order discrete memristor and its FPGA implementation | |
| Wani et al. | Certain properties and applications of the 2D Sheffer and related polynomials |