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2. Synergetics and Acoustic Emission Approach for Crazing Nonlinear Dynamical Systems.
- Author
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Gao, Guodong and Xing, Yongming
- Subjects
- *
SYNERGETICS , *NONLINEAR dynamical systems , *ACOUSTIC emission - Abstract
This paper reports that synergetics are used to analyze the crazing evolution. On this basis, chaotic effect is explored. The chaos equation is established and verified. The theoretical derivation are consistent with the experimental results. We design a special specimen with a special loading mode, the transient monitoring function of acoustic emission (AE) technology is used to track and detect the crazing inside the PMMA in real time, and the experiments show that synergetics can explain the crazing properties of polymer. Importantly, the mathematical explanation is also given. The AE analysis, synergetics, and craze photo reached a conclusion that the crazing has chaotic behavior. After analyzing the AE events and crazing at different stress levels, the accuracy of synergetic approach for crazing is verified. By studying the course of AE events and crazing, the self-organization effect is proposed. The research results will provide data support for the application of PMMA in ship, aircraft, and precision instruments. [ABSTRACT FROM AUTHOR]
- Published
- 2020
- Full Text
- View/download PDF
3. Categorizing Chaotic Flows from the Viewpoint of Fixed Points and Perpetual Points.
- Author
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Nazarimehr, Fahimeh, Jafari, Sajad, Golpayegani, Seyed Mohammad Reza Hashemi, and Sprott, J. C.
- Subjects
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CHAOS theory , *FIXED point theory , *NONLINEAR dynamical systems , *MATHEMATICAL analysis , *MATHEMATICS - Abstract
Perpetual points represent a new interesting topic in the literature of nonlinear dynamics. This paper introduces some chaotic flows with four different structural features from the viewpoint of fixed points and perpetual points. [ABSTRACT FROM AUTHOR]
- Published
- 2017
- Full Text
- View/download PDF
4. EFFECT OF JUMP DISCONTINUITY FOR PHASE-RANDOMIZED SURROGATE DATA TESTING.
- Author
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MAMMEN, ENNO, NANDI, SWAGATA, MAIWALD, THOMAS, and TIMMER, JENS
- Subjects
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ALGORITHMS , *FOURIER analysis , *ANALYSIS of covariance , *GAUSSIAN processes , *MATHEMATICS - Abstract
In this paper we discuss two modifications of the surrogate data method based on phase randomization, see [Theiler et al., 1992]. By construction, phase randomized surrogates are circular stationary. In this respect they differ from the original time series. This can cause level inaccuracies of surrogate data tests. We will illustrate this. These inaccuracies are caused by end to end mismatches of the original time series. In this paper we will discuss two approaches to remedy this problem: resampling from subsequences without end to end mismatches and data tapering. Both methods can be understood as attempts to make non-circular data approximately circular. We will show that the first method works quite well for a large range of applications whereas data tapering leads only to improvements in some examples but can be very unstable otherwise. [ABSTRACT FROM AUTHOR]
- Published
- 2009
- Full Text
- View/download PDF
5. DYNAMICAL BEHAVIOR OF THE ALMOST-PERIODIC DISCRETE FITZHUGH–NAGUMO SYSTEMS.
- Author
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WANG, BIXIANG
- Subjects
- *
DYNAMICS , *ANALYTICAL mechanics , *MATHEMATICS , *LATTICE theory , *ABSTRACT algebra , *BOOLEAN algebra , *GROUP theory - Abstract
In this paper, we study the dynamical behavior of nonautonomous, almost-periodic discrete FitzHugh–Nagumo system defined on infinite lattices. We prove that the nonautonomous infinite-dimensional system has a uniform attractor which attracts all solutions uniformly with respect to the translations of external terms. We also establish the upper semicontinuity of uniform attractors when the infinite-dimensional system is approached by a family of finite-dimensional systems. This paper is based on a uniform tail method, which shows that, for large time, the tails of solutions are uniformly small with respect to bounded initial data as well as the translations of external terms. The uniform tail estimates play a crucial role for proving the uniform asymptotic compactness of the system and the upper semicontinuity of attractors. [ABSTRACT FROM AUTHOR]
- Published
- 2007
- Full Text
- View/download PDF
6. MODEL REDUCTION FOR FLUIDS, USING BALANCED PROPER ORTHOGONAL DECOMPOSITION.
- Author
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ROWLEY, C. W.
- Subjects
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FLUIDS , *ORTHOGONAL decompositions , *MATHEMATICAL decomposition , *MATHEMATICS , *PROBABILITY theory , *DYNAMICS - Abstract
Many of the tools of dynamical systems and control theory have gone largely unused for fluids, because the governing equations are so dynamically complex, both high-dimensional and nonlinear. Model reduction involves finding low-dimensional models that approximate the full high-dimensional dynamics. This paper compares three different methods of model reduction: proper orthogonal decomposition (POD), balanced truncation, and a method called balanced POD. Balanced truncation produces better reduced-order models than POD, but is not computationally tractable for very large systems. Balanced POD is a tractable method for computing approximate balanced truncations, that has computational cost similar to that of POD. The method presented here is a variation of existing methods using empirical Gramians, and the main contributions of the present paper are a version of the method of snapshots that allows one to compute balancing transformations directly, without separate reduction of the Gramians; and an output projection method, which allows tractable computation even when the number of outputs is large. The output projection method requires minimal additional computation, and has a priori error bounds that can guide the choice of rank of the projection. Connections between POD and balanced truncation are also illuminated: in particular, balanced truncation may be viewed as POD of a particular dataset, using the observability Gramian as an inner product. The three methods are illustrated on a numerical example, the linearized flow in a plane channel. [ABSTRACT FROM AUTHOR]
- Published
- 2005
- Full Text
- View/download PDF
7. FLOWER PATTERNS APPEARING ON A HONEYCOMB STRUCTURE AND THEIR BIFURCATION MECHANISM.
- Author
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Isao Saiki, Ikeda, Kiyohiro, and Kazuo Murota
- Subjects
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FLUID dynamics , *HONEYCOMBS , *BIFURCATION theory , *CHAOS theory , *NONLINEAR theories , *NUMERICAL analysis , *MATHEMATICS - Abstract
Illuminative deformation patterns of a honeycomb structure are presented. A representative volume element of a honeycomb structure consisting of 2 × 2 hexagonal cells is modeled to be a ${\rm D}_6\dot{+}({\rm C}_2\times\tilde{\rm C}_2)$-equivariant system. The bifurcation mechanism and an exhaustive list of possible bifurcated patterns are obtained by group-theoretic bifurcation theory. A flower mode of the honeycomb is shown to have the same symmetry as the so-called anti-hexagon in the Rayleigh–Bénard convection. A numerical bifurcation analysis is conducted on an elastic in-plane honeycomb structure consisting of 2×2 cells to produce beautiful wallpapers of bifurcating deformation patterns and, in turn, to highlight the achievement of the paper. New deformation patterns of a honeycomb structure have been found and classified in a systematic manner. Knowledge of the symmetries of the bifurcating solutions has turned out to be vital in the successful numerical tracing of the bifurcated paths. This paper paves the way for the introduction of the results hitherto obtained for flow patterns in fluid dynamics into the study of patterns on materials. [ABSTRACT FROM AUTHOR]
- Published
- 2005
- Full Text
- View/download PDF
8. ON THE EXISTENCE OF A STABLE PERIODIC SOLUTION OF AN IMPACTING OSCILLATOR WITH TWO FENDERS.
- Author
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Czolczynski, Krzysztof and Kapitaniak, Tomasz
- Subjects
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EQUATIONS , *OSCILLATIONS , *ALGEBRA , *MATHEMATICS , *FLUCTUATIONS (Physics) , *MOTION - Abstract
A system that consists of a damped oscillator impacting two immovable fenders has been considered in this paper. In the first part a method of analytical determination of the existence of periodic solutions to the equations of motion and a method of analysis of the stability of these solutions have been presented. The results of the computations carried out by means of these methods have been illustrated by a few examples. In the second part of the paper, the results of some numerical investigations have been presented. The goal of these studies was to determine, in which regions of parameters characterizing the system, the motion of the oscillator is periodic and stable. [ABSTRACT FROM AUTHOR]
- Published
- 2004
- Full Text
- View/download PDF
9. CHEN'S ATTRACTOR EXISTS.
- Author
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Tianshou Zhou, Yun Tang, and Guanrong Chen
- Subjects
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GEOMETRY , *ORBIT method , *REPRESENTATIONS of algebras , *REPRESENTATIONS of groups (Algebra) , *GEOMETRIC series , *MATHEMATICS - Abstract
By applying the undetermined coefficient method, this paper finds homoclinic and heteroclinic orbits in the Chen system. It analytically demonstrates that the Chen system has one heteroclinic orbit of Ši'lnikov type that connects two nontrivial singular points. The Ši'lnikov criterion guarantees that the Chen system has Smale horseshoes and the horseshoe chaos. In addition, there also exists one homoclinic orbit joined to the origin. The uniform convergence of the series expansions of these two types of orbits are proved in this paper. It is shown that the heteroclinic and homoclinic orbits together determine the geometric structure of Chen's attractor. [ABSTRACT FROM AUTHOR]
- Published
- 2004
- Full Text
- View/download PDF
10. Attractivity and Stability Analysis of Uncertain Differential Systems.
- Author
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Tao, Nana and Zhu, Yuanguo
- Subjects
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STABILITY theory , *UNCERTAINTY (Information theory) , *DIFFERENTIAL equations , *MATHEMATICAL analysis , *MATHEMATICS - Abstract
Uncertain differential system is a type of differential system involving uncertain processes. Stability analysis has been widely studied but no work has been dedicated to attractivity analysis of uncertain differential systems. In this paper, some concepts of attractivity for uncertain differential systems are presented. Then the corresponding sufficient and necessary conditions are given. Furthermore, the stability of the solutions and α-path of uncertain differential systems are studied. [ABSTRACT FROM AUTHOR]
- Published
- 2015
- Full Text
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11. THE EXACT TRAVELING WAVE SOLUTIONS AND THEIR BIFURCATIONS IN THE GARDNER AND GARDNER-KP EQUATIONS.
- Author
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YAN, FANG, HUA, CUNCAI, LIU, HAIHONG, and LIU, ZENGRONG
- Subjects
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TRAVELING waves (Physics) , *BIFURCATION theory , *DYNAMICS , *MATHEMATICAL series , *EQUATIONS , *MATHEMATICS , *ALGEBRA - Abstract
By using the method of dynamical systems, this paper studies the exact traveling wave solutions and their bifurcations in the Gardner equation. Exact parametric representations of all wave solutions as well as the explicit analytic solutions are given. Moreover, several series of exact traveling wave solutions of the Gardner-KP equation are obtained via an auxiliary function method. [ABSTRACT FROM AUTHOR]
- Published
- 2012
- Full Text
- View/download PDF
12. BIFURCATION ANALYSIS OF THE SWIFT–HOHENBERG EQUATION WITH QUINTIC NONLINEARITY.
- Author
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QINGKUN XIAO and HONGJUN GAO
- Subjects
- *
BIFURCATION theory , *DIFFERENTIAL equations , *ASYMPTOTIC theory of algebraic ideals , *MANIFOLDS (Mathematics) , *MATHEMATICS - Abstract
This paper is concerned with the asymptotic behavior of the solutions u(x,t) of the Swift–Hohenberg equation with quintic nonlinearity on a one-dimensional domain (0, L). With α and the length L of the domain regarded as bifurcation parameters, branches of nontrivial solutions bifurcating from the trivial solution at certain points are shown. Local behavior of these branches are also studied. Global bounds for the solutions u(x,t) are established and then the global attractor is investigated. Finally, with the help of a center manifold analysis, two types of structures in the bifurcation diagrams are presented when the bifurcation points are closer, and their stabilities are analyzed. [ABSTRACT FROM AUTHOR]
- Published
- 2009
- Full Text
- View/download PDF
13. A PARAMETER-SPACE OF A CHUA SYSTEM WITH A SMOOTH NONLINEARITY.
- Author
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ALBUQUERQUE, HOLOKX A. and RECH, PAULO C.
- Subjects
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DIFFERENTIAL equations , *CALCULUS , *BESSEL functions , *MATHEMATICS , *EQUATIONS - Abstract
In this paper we investigate, via numerical simulations, the parameter space of the set of autonomous differential equations of a Chua oscillator, where the piecewise-linear function usually taken to describe the nonlinearity of the Chua diode was replaced by a cubic polynomial. As far as we know, we are the first to report that this parameter-space presents islands of periodicity embedded in a sea of chaos, scenario typically observed only in discrete-time models until recently. We show that these islands are self-similar, and organize themselves in period-adding bifurcation cascades. [ABSTRACT FROM AUTHOR]
- Published
- 2009
- Full Text
- View/download PDF
14. RECONFIGURABLE IMPLEMENTATIONS OF CHUA'S CIRCUIT.
- Author
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KILIC, RECAI and DALKIRAN, FATMA YILDIRIM
- Subjects
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ELECTRIC circuits , *ELECTRONIC circuit design , *ELECTRONICS , *MATHEMATICS , *EQUATIONS - Abstract
Chua's circuit is very suitable as a programmable chaos generator because of its robust nonlinearity. In addition to exhibiting a rich variety of bifurcation and chaos phenomenon, this circuit can be modeled and realized with a fixed main system block and many different nonlinear function blocks such as piecewise-linear function, cubic-like function, piecewise-quadratic function and other trigonometric functions. This paper presents a FPAA (Field Programmable Analog Array) based programmable implementation of Chua's circuit. Nonlinear function blocks used in Chua's circuit are modeled with an FPAA and hence a model can be rapidly changed for realization of other nonlinear functions. In this study, four FPAA-based reconfigurable implementations of Chua's circuit have been realized. Experimental results agree with numerical simulation and results obtained from discrete electronic implementations of Chua's circuit. [ABSTRACT FROM AUTHOR]
- Published
- 2009
- Full Text
- View/download PDF
15. IRREGULARLY DECIMATED CHAOTIC MAP(S) FOR BINARY DIGITS GENERATIONS.
- Author
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KANSO, ALI and SMAOUI, NEJIB
- Subjects
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QUADRATIC forms , *NUMBER theory , *MATHEMATICS , *THRESHOLD logic - Abstract
This paper proposes a new technique for generating random-looking binary digits based on an irregularly decimated chaotic map. We present a class of irregularly decimated chaos-based keystream generators, related to the shrinking generator, for the generation of binary sequences. Each generator consists of two subsystems: a control subsystem and a generating subsystem, where each subsystem is based on a single chaotic map. This chaotic map is presented as a 1-D piecewise chaotic map related to the chaotic logistic map. We conduct an analysis of the dynamical behavior of the proposed map to integrate it as a component in the proposed generators subsystems. The output bits of these keystream generators are produced by applying a threshold function to convert the floating-point iterates of the irregularly decimated map into a binary form. The generated keystream bits are demonstrated to exhibit high level of security, long period length, high linear complexity measure and random-like properties at given certain parameter values. Standard statistical tests on the proposed generators, as well as other keystream generators, are performed and compared. [ABSTRACT FROM AUTHOR]
- Published
- 2009
- Full Text
- View/download PDF
16. A PIECEWISE LINEAR DYNAMICAL SYSTEM WITH TWO DROPPING SECTIONS.
- Author
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GAIKO, VALERY A. and VAN HORSSEN, WIM T.
- Subjects
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SURROUND-sound systems , *HIGH-fidelity sound systems , *DIFFERENTIABLE dynamical systems , *MATHEMATICS , *NONLINEAR functional analysis - Abstract
In this paper, we consider a planar dynamical system with a piecewise linear function containing two dropping sections and approximating some continuous nonlinear function. Studying all possible local and global bifurcations of its limit cycles, we prove that such a piecewise linear dynamical system, with five singular points, can have at most four limit cycles, three of which surround the foci one by one and the fourth limit cycle surrounds all of the singular points of this system. [ABSTRACT FROM AUTHOR]
- Published
- 2009
- Full Text
- View/download PDF
17. SIMPLEST NORMAL FORMS FOR PLANAR SYSTEMS ON EQUILIBRIUM MANIFOLDS.
- Author
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MU LIN, YUN TANG, GUANRONG CHEN, and YUMING SHI
- Subjects
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NORMAL forms (Mathematics) , *MATHEMATICS , *EQUATIONS , *MATHEMATICAL singularities , *MANIFOLDS (Mathematics) - Abstract
Equilibrium manifold is a manifold that consists of equilibrium points. Planar systems with one-dimensional equilibrium manifolds are considered in this paper. First, for such planar systems, a unified equation with the horizontal axis as the equilibrium curve is formulated. Then, according to the corresponding linearized systems, different cases are discussed: For the nondegenerate case, the simplest normal form of a system with simplified Bogdanov–Takens singularities is obtained; for the general first-order degenerative case, the simplest normal forms are completely characterized; finally, for the general higher-order degenerative case, deduction of the simplest normal form is illustrated. [ABSTRACT FROM AUTHOR]
- Published
- 2009
- Full Text
- View/download PDF
18. THE NONDEGENERATE CENTER PROBLEM IN CERTAIN FAMILIES OF PLANAR DIFFERENTIAL SYSTEMS.
- Author
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GINÉ, JAUME and DE PRADA, PAZ
- Subjects
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DIFFERENTIABLE dynamical systems , *DIFFERENTIAL equations , *POLYNOMIALS , *COMMUTATORS (Operator theory) , *MATHEMATICS - Abstract
This paper concerns the nondegenerate center problem in certain families of differential systems in ℝ2. We study the existence of uniformly isochronous centers and the form of their commutators. We also classify all centers of the family of the BiLiénard systems of degree five and the maximum number of limit cycles which can bifurcate from a fine focus. [ABSTRACT FROM AUTHOR]
- Published
- 2009
- Full Text
- View/download PDF
19. LIMIT CYCLE BIFURCATIONS IN NEAR-HAMILTONIAN SYSTEMS BY PERTURBING A NILPOTENT CENTER.
- Author
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HAN, MAOAN, JIANG, JIAO, and ZHU, HUAIPING
- Subjects
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BIFURCATION theory , *TOPOLOGICAL dynamics , *MATHEMATICS , *DIFFERENTIABLE dynamical systems , *HAMILTONIAN systems - Abstract
As we know, Hopf bifurcation is an important part of bifurcation theory of dynamical systems. Almost all known works are concerned with the bifurcation and number of limit cycles near a nondegenerate focus or center. In the present paper, we study a general near-Hamiltonian system on the plane whose unperturbed system has a nilpotent center. We obtain an expansion for the first order Melnikov function near the center together with a computing method for the first coefficients. Using these coefficients, we obtain a new bifurcation theorem concerning the limit cycle bifurcation near the nilpotent center. An interesting application example & a cubic system having five limit cycles & is also presented. [ABSTRACT FROM AUTHOR]
- Published
- 2008
- Full Text
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20. THE CONNECTEDNESS LOCUS OF A FAMILY OF REAL BIQUADRATIC POLYNOMIALS.
- Author
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YESHUN SUN and YONGCHENG YIN
- Subjects
- *
BIQUADRATIC equations , *POLYNOMIALS , *ALGEBRA , *MATHEMATICS , *REAL numbers - Abstract
In this paper we present a precise description of the connectedness locus of the family of polynomials (z2 + x)2 + y, where x, y are real numbers. [ABSTRACT FROM AUTHOR]
- Published
- 2007
- Full Text
- View/download PDF
21. LOCAL AND GLOBAL BIFURCATIONS TO LIMIT CYCLES IN A CLASS OF LIÉNARD EQUATION.
- Author
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YU, PEI
- Subjects
- *
LIMIT cycles , *DIFFERENTIABLE dynamical systems , *NORMAL forms (Mathematics) , *MATHEMATICS , *SCIENCE - Abstract
In this paper, we study limit cycles in the Liénard equation: ẍ + f(x)ẋ + g(x) = 0 where f(x) is an even polynomial function with degree 2m, while g(x) is a third-degree, odd polynomial function. In phase space, the system has three fixed points, one saddle point at the origin and two linear centers which are symmetric about the origin. It is shown that the system can have 2m small (local) limit cycles in the vicinity of two focus points and several large (global) limit cycles enclosing all the small limit cycles. The method of normal forms is employed to prove the existence of the small limit cycles and numerical simulation is used to show the existence of large limit cycles. [ABSTRACT FROM AUTHOR]
- Published
- 2007
- Full Text
- View/download PDF
22. THE GEOMETRY OF QUADRATIC DIFFERENTIAL SYSTEMS WITH A WEAK FOCUS OF SECOND ORDER.
- Author
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ARTÉS, JOAN C., LLIBRE, JAUME, and SCHLOMIUK, DANA
- Subjects
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QUADRATIC differentials , *LIMIT cycles , *BIFURCATION theory , *MATHEMATICS , *DIFFERENTIAL equations , *NUMERICAL analysis - Abstract
Planar quadratic differential systems occur in many areas of applied mathematics. Although more than one thousand papers were written on these systems, a complete understanding of this class is still missing. Classical problems, and in particular, Hilbert's 16th problem [Hilbert, 1900, 1902], are still open for this class. In this article we make an interdisciplinary global study of the subclass $\overline{QW2}$ which is the closure within real quadratic differential systems, of the family QW2 of all such systems which have a weak focus of second order. This class $\overline{QW2}$ also includes the family of all quadratic differential systems possessing a weak focus of third order and topological equivalents of all quadratic systems with a center. The bifurcation diagram for this class, done in the adequate parameter space which is the three-dimensional real projective space, is quite rich in its complexity and yields 373 subsets with 126 phase portraits for $\overline{QW2}$, 95 for QW2, 20 having limit cycles but only three with the maximum number of limit cycles (two) within this class. The phase portraits are always represented in the Poincaré disc. The bifurcation set is formed by an algebraic set of bifurcations of singularities, finite or infinite and by a set of points which we suspect to be analytic corresponding to global separatrices which have connections. Algebraic invariants were needed to construct the algebraic part of the bifurcation set, symbolic computations to deal with some quite complex invariants and numerical calculations to determine the position of the analytic bifurcation set of connections. The global geometry of this class $\overline{QW2}$ reveals interesting bifurcations phenomena; for example, all phase portraits with limit cycles in this class can be produced by perturbations of symmetric (reversible) quadratic systems with a center. Many other nonlinear phenomena displayed here form material for further studies. [ABSTRACT FROM AUTHOR]
- Published
- 2006
- Full Text
- View/download PDF
23. A GLOBAL PERIOD-1 MOTION OF A PERIODICALLY EXCITED, PIECEWISE-LINEAR SYSTEM.
- Author
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Menon, Santhosh and Luo, Albert C. J.
- Subjects
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LINEAR systems , *SYSTEMS theory , *POINCARE series , *NONSMOOTH optimization , *MATHEMATICAL optimization , *MATHEMATICAL analysis , *MATHEMATICS - Abstract
The period-1 motion of a piecewise-linear system under a periodic excitation is predicted analytically through the Poincaré mapping and the corresponding mapping sections formed by the switch planes pertaining to the two constraints. The mapping relationship generates a set of nonlinear algebraic equations from which the period-1 motion is determined analytically. The stability and bifurcation of the period-1 motion are determined, and numerical simulations are carried out for confirmation of the analytical prediction of period-1 motion. An unsymmetrical stable period-1 motion is observed. This investigation helps us understand the dynamical behavior of period-1 motion in the piecewise-linear system and more efficiently obtain other periodic motions and chaos through numerical simulations. The similar methodology presented in this paper can be used for other nonsmooth dynamical systems. [ABSTRACT FROM AUTHOR]
- Published
- 2005
- Full Text
- View/download PDF
24. HOPF BIFURCATION CONTROL OF DELAYED SYSTEMS WITH WEAK NONLINEARITY VIA DELAYED STATE FEEDBACK.
- Author
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WANG, ZAIHUA and HU, HAIYAN
- Subjects
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BIFURCATION theory , *NUMERICAL solutions to nonlinear differential equations , *STABILITY (Mechanics) , *DIFFERENTIAL equations , *NONLINEAR theories , *MATHEMATICS - Abstract
This paper presents a study on the problem of Hopf bifurcation control of time delayed systems with weak nonlinearity via delayed feedback control. It focusses on two control objectives: one is to annihilate the periodic solution, namely to perform a linear delayed feedback control so that the trivial equilibrium is asymptotically stable, and the other is to obtain an asymptotically stable periodic solution with given amplitude via linear or nonlinear delayed feedback control. On the basis of the averaging method and the center manifold reduction for delayed differential equations, an effective method is developed for this problem. It has been shown that a linear delayed feedback can always stabilize the unstable trivial equilibrium of the system, and a linear or nonlinear delayed feedback control can always achieve an asymptotically stable periodic solution with desired amplitude. The illustrative example shows that the theoretical prediction is in very good agreement with the simulation results, and that the method is valid with high accuracy not only for delayed systems with weak nonlinearity and via weak feedback control, but also for those when the nonlinearity and feedback control are not small. [ABSTRACT FROM AUTHOR]
- Published
- 2005
- Full Text
- View/download PDF
25. ON SOME GLOBAL BIFURCATIONS OF THE DOMAINS OF FEASIBLE TRAJECTORIES:: AN ANALYSIS OF RECURRENCE EQUATIONS.
- Author
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GU, EN-GUO and RUAN, JIONG
- Subjects
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BIFURCATION theory , *TRAJECTORY optimization , *AERODYNAMICS , *EQUATIONS , *ALGEBRA , *MATHEMATICS - Abstract
This paper is an attempt to give new results, by a computer-assisted study, on some global bifurcations that change the structure of the domain of feasible trajectories (bounded discrete trajectories having an ecological sense) which can be obtained by the union of all rank preimages of axes. Three two-dimensional recurrence equations (or maps) are analyzed. The two first maps are degenerated invertible maps (i.e. the inverses of them are well defined except a set of zero lebergue measure) for which the basins of attractor are obtained by the backward iteration of a stable manifold of a saddle fixed point belonging to the basin boundary, and the interior domains of feasible trajectories are given by the intersection between the basin of attractor and the first quadrant. The other is a noninvertible map which is investigated by the use of critical curves, a powerful tool for the analysis of global properties of two-dimensional maps. [ABSTRACT FROM AUTHOR]
- Published
- 2005
- Full Text
- View/download PDF
26. COMMUTATORS OF SKEW-SYMMETRIC MATRICES.
- Author
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BLOCH, ANTHONY M. and ISERLES, ARIEH
- Subjects
- *
MATHEMATICS , *MATRICES (Mathematics) , *GEOMETRY , *FROBENIUS algebras , *ASSOCIATIVE algebras , *COMMUTATORS (Operator theory) - Abstract
In this paper we develop a theory for analysing the "radius" of the Lie algebra of a matrix Lie group, which is a measure of the size of its commutators. Complete details are given for the Lie algebra 픰픬(n) of skew symmetric matrices where we prove $\| [X,Y] \| \leq \sqrt{2} \|X\| \cdot \|Y\|$, X, Y ∈ 픰픬(n), for the Frobenius norm. We indicate how these ideas might be extended to other matrix Lie algebras. We discuss why these ideas are of interest in applications such as geometric integration and optimal control. [ABSTRACT FROM AUTHOR]
- Published
- 2005
- Full Text
- View/download PDF
27. LAG SYNCHRONIZATION OF CHAOTIC LUR'E SYSTEMS VIA REPLACING VARIABLES CONTROL.
- Author
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Xiaofeng Wu, Yi Zhao, and Sheng Zhou
- Subjects
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SYNCHRONIZATION , *BIFURCATION theory , *CHAOS theory , *NUMERICAL analysis , *MATHEMATICS - Abstract
In this paper, we propose a method to research lag synchronization of the identical master-slave chaotic Lur'e systems via replacing variables control with time delay. By means of absolute stability theory, we prove two types of sufficient conditions for the lag synchronization: Lur'e criterion and frequency domain criterion. Based on the criteria, we suggest an optimization scheme to design the control variables. Applying the scheme to general Chua's circuits, we obtain the parameter ranges in which the master-slave Chua's circuits laggingly synchronize or not by varied single-variable control. Finally, we cite the examples by illustration of the results. [ABSTRACT FROM AUTHOR]
- Published
- 2005
- Full Text
- View/download PDF
28. SET STABILIZATION OF A MODIFIED CHUA'S CIRCUIT.
- Author
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Shihua Li and Yu-Ping Tian
- Subjects
- *
STABILITY (Mechanics) , *BIFURCATION theory , *CHAOS theory , *NONLINEAR theories , *NUMERICAL analysis , *MATHEMATICS - Abstract
In this paper, we develop a simple linear feedback controller, which employs only one of the states of the system, to stabilize the modified Chua's circuit to an invariant set which consists of its nontrivial equilibria. Moreover, we show for the first time that the closed loop modified Chua's circuit satisfies set stability which can be considered as a generalization of common Lyapunov stability of an equilibrium point. Simulation results are presented to verify our method. [ABSTRACT FROM AUTHOR]
- Published
- 2005
- Full Text
- View/download PDF
29. GLOBAL BIFURCATION OF LIMIT CYCLES IN A FAMILY OF MULTIPARAMETER SYSTEM.
- Author
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Guanghui Xiang and Maoan Han
- Subjects
- *
LIMIT cycles , *DIFFERENTIABLE dynamical systems , *BIFURCATION theory , *POLYNOMIALS , *DIFFERENTIAL equations , *MATHEMATICS - Abstract
In this paper, we study the number of limit cycles in a family of polynomial systems. Using bifurcation methods, we obtain the maximal number of limit cycles in global bifurcation. [ABSTRACT FROM AUTHOR]
- Published
- 2004
- Full Text
- View/download PDF
30. LIMIT CYCLING IN AN OBSERVER-BASED CONTROLLED SYSTEM WITH FRICTION:: NUMERICAL ANALYSIS AND EXPERIMENTAL VALIDATION.
- Author
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Putra, Devi and Nijmeijer, Henk
- Subjects
- *
LIMIT cycles , *FRICTION , *MECHANICS (Physics) , *DIFFERENTIABLE dynamical systems , *BIFURCATION theory , *MATHEMATICS - Abstract
This paper investigates limit cycling behavior of observer-based controlled mechanical systems with friction compensation. The limit cycling is induced by the interaction between friction and friction compensation, which is based on the estimated velocity. The limit cycling phenomenon, which is experimentally observed in a rotating arm manipulator, is analyzed through computational bifurcation analysis. The computed bifurcation diagram confirms that the limit cycles can be eliminated by enlarging observer gains and controller gains at the cost of a steady state error. The numerical results match well with laboratory experiments. [ABSTRACT FROM AUTHOR]
- Published
- 2004
- Full Text
- View/download PDF
31. MULTI-INPUT AND MULTI-OUTPUT NONLINEAR SYSTEMS:: INTERCONNECTED CHUA'S CIRCUITS.
- Author
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Zhisheng Duan, Jinzhi Wang, and Lin Huang
- Subjects
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NONLINEAR systems , *INTEGRATED circuit interconnections , *SYSTEMS theory , *NONLINEAR integral equations , *ANALOG integrated circuits , *MATHEMATICS - Abstract
In this paper, a class of MIMO nonlinear systems are studied. Some frequency domain conditions are established for the property of dichotomy. These kinds of systems can also be viewed as a class of interconnected systems composed of SISO systems through some linear and nonlinear interconnections. A class of nonlinear input and output interconnections are presented. The corresponding condition for testing dichotomy is given. Furthermore, Chua's circuit and interconnected Chua's circuit are studied to illustrate the theoretical results. [ABSTRACT FROM AUTHOR]
- Published
- 2004
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32. CHAOTIC BEATS IN A MODIFIED CHUA'S CIRCUIT:: DYNAMIC BEHAVIOR AND CIRCUIT DESIGN.
- Author
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Cafagna, Donato and Grassi, Giuseppe
- Subjects
- *
CHAOS theory , *DIODES , *DYNAMICS , *DIFFERENTIABLE dynamical systems , *ANALYTICAL mechanics , *MATHEMATICS - Abstract
This paper illustrates the recent phenomenon of chaotic beats in a modified version of Chua's circuit, driven by two sinusoidal inputs with slightly different frequencies. In order to satisfy the constraints imposed by the beats dynamics, a novel implementation of the voltage-controlled characteristic of the Chua diode is proposed. By using Pspice simulator, the behavior of the designed circuit is analyzed both in time-domain and state-space, confirming the chaotic nature of the phenomenon and the effectiveness of the approach. [ABSTRACT FROM AUTHOR]
- Published
- 2004
- Full Text
- View/download PDF
33. THE FOLD-FLIP BIFURCATION.
- Author
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Kuznetsov, Yu. A., Meijer, H. G. E., and Veen, L. Van
- Subjects
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BIFURCATION theory , *NUMERICAL solutions to nonlinear differential equations , *LORENZ equations , *DIFFERENTIAL equations , *NORMAL forms (Mathematics) , *MATHEMATICS - Abstract
The fold-flip bifurcation occurs if a map has a fixed point with multipliers +1 and -1 simultaneously. In this paper the normal form of this singularity is calculated explicitly. Both local and global bifurcations of the unfolding are analyzed by exploring a close relationship between the derived normal form and the truncated amplitude system for the fold-Hopf bifurcation of ODEs. Two examples are presented, the generalized Hénon map and an extension of the Lorenz-84 model. In the latter example the first-, second- and third-order derivatives of the Poincaré map are computed using variational equations to find the normal form coefficients. [ABSTRACT FROM AUTHOR]
- Published
- 2004
- Full Text
- View/download PDF
34. PIECEWISE TWO-DIMENSIONAL MAPS AND APPLICATIONS TO CELLULAR NEURAL NETWORKS.
- Author
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Chang, Hsin-Mei and Juang, Jong
- Subjects
- *
ARTIFICIAL neural networks , *ARTIFICIAL intelligence , *LINEAR operators , *SELF-organizing maps , *MATHEMATICS , *OPERATOR theory - Abstract
Of concern is a two-dimensional map T of the form T(x,y)=(y,F(y)-bx). Here F is a three-piece linear map. In this paper, we first prove a theorem which states that a semiconjugate condition for T implies the existence of Smale horseshoe. Second, the theorem is applied to show the spatial chaos of one-dimensional Cellular Neural Networks. We improve a result of Hsu [2000]. [ABSTRACT FROM AUTHOR]
- Published
- 2004
- Full Text
- View/download PDF
35. ALGORITHM FOR ESTIMATION OF THE STABLE BASIN IN CONTROLLING CHAOTIC DISCRETE DYNAMICS.
- Author
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En-Guo Gu, Jiong Ruan, and Wet Lin
- Subjects
- *
CHAOS theory , *ALGORITHMS , *JACOBI method , *POLYNOMIALS , *MATHEMATICS , *DISCRETE geometry , *MATRICES (Mathematics) - Abstract
In this paper, we apply OPCL control to discrete system, and based on relative nonlinear measure, give an algorithm for estimating the radius of stable basin. We rigorously prove that this basin is bound to be of existence for nonlinear discrete system, whose goal dynamics is either periodic orbits or fixed point. We also, in particular, investigate the stable basin in a quadratic polynomial map system, and present that the stable basin is irrelevant to the goal orbits with a negative Jacobian gain matrix. Furthermore, we take the well-known Hénon system and Ikeda system as examples to illustrate the implementation of our theory, and give the corresponding simulations to reinforce our method. [ABSTRACT FROM AUTHOR]
- Published
- 2004
- Full Text
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36. BOUNDARY FEEDBACK ANTICONTROL OF SPATIOTEMPORAL CHAOS FOR 1D HYPERBOLIC DYNAMICAL SYSTEMS.
- Author
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Yu Huang
- Subjects
- *
CHAOS theory , *PLANE curves , *HYPERBOLA , *WAVE equation , *NONLINEAR wave equations , *NUMERICAL analysis , *MATHEMATICS - Abstract
In this paper, boundary anticontrol of spatiotemporal chaos for 1D hyperbolic equations is studied. Firstly, a new definition of chaotic vibrations for PDEs is given in terms of the growth rate of the total variations of the solutions with respect to the spatial variable as t→∞. Then, a boundary feedback controller is designed as composing with a sawtooth function, which can drive the originally nonchaotic linear or nonlinear dynamical system chaotic. Finally, as applications, anticontrol of chaos for 1D linear wave equations with linear or nonlinear boundary conditions is discussed. [ABSTRACT FROM AUTHOR]
- Published
- 2004
- Full Text
- View/download PDF
37. ALMOST RADIALLY-INVARIANT SYSTEMS CONTAINING ARBITRARY KNOTS AND LINKS.
- Author
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Banks, S. P. and Diaz, D.
- Subjects
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INVARIANT sets , *KNOT theory , *CHAOS theory , *DIFFERENTIABLE dynamical systems , *PARTIAL differential equations , *MATHEMATICS - Abstract
In this paper we show that a system containing any knot or link can be directly constructed in a simple way. The system is not chaotic and can even contain wild knots. [ABSTRACT FROM AUTHOR]
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- 2004
- Full Text
- View/download PDF
38. QUALITATIVE RESONANCE OF SHIL'NIKOV-LIKE STRANGE ATTRACTORS, PART I:: EXPERIMENTAL EVIDENCE.
- Author
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de Feo, Oscar
- Subjects
- *
CONTROL theory (Engineering) , *SYNCHRONIZATION , *PATTERN recognition systems , *CHAOS theory , *NONLINEAR systems , *DYNAMICS , *BIFURCATION theory , *MATHEMATICS - Abstract
This is the first of two papers introducing a new dynamical phenomenon, strongly related to the problems of synchronization and control of chaotic dynamical systems, and presenting the corresponding mathematical analysis, conducted both experimentally and theoretically. In particular, it is shown that different dynamical models (ordinary differential equations) admitting chaotic behavior organized by a homoclinic bifurcation to a saddle-focus (Shil'nikov-like chaos) tend to have a particular selective property when externally perturbed. Namely, these systems settle on a very narrow chaotic behavior, which is strongly correlated to the forcing signal, when they are slightly perturbed with an external signal which is similar to their corresponding generating cycle. Here, the "generating cycle" is understood to be the saddle cycle colliding with the equilibrium at the homoclinic bifurcation. On the other hand, when they are slightly perturbed with a generic signal, which has no particular correlation with their generating cycle, their chaotic behavior is reinforced. This peculiar behavior has been called qualitative resonance underlining the fact that such chaotic systems tend to resonate with signals that are qualitatively similar to an observable of their corresponding generating cycle. Here, the results of an experimental analysis are presented together with an intuitive geometrical qualitative model of the phenomenon. [ABSTRACT FROM AUTHOR]
- Published
- 2004
- Full Text
- View/download PDF
39. CONTROL OF THE CHUA'S SYSTEM BASED ON A DIFFERENTIAL FLATNESS APPROACH.
- Author
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Aguilar-Ibáñez, Carlos, Su&arez-Casta&ñón, Miguel, and Sira-Ramírez, Herbert
- Subjects
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CHAOS theory , *NONLINEAR systems , *PID controllers , *SYSTEMS engineering , *STABILITY (Mechanics) , *AUTOMATIC control systems , *DIFFERENTIABLE dynamical systems , *MATHEMATICS - Abstract
In this paper, we present a flatness based control approach for the stabilization and tracking problem, for the well-known Chua chaotic circuit, that includes an additional input. We introduce two feedback controller design options for the set-point stabilization and the trajectory tracking problem: a direct pole placement approach, and Generalized Proportional Integral (GPI) approach based only on measured inputs and outputs. [ABSTRACT FROM AUTHOR]
- Published
- 2004
- Full Text
- View/download PDF
40. TIME-DELAYED IMPULSIVE CONTROL OF CHAOTIC HYBRID SYSTEMS.
- Author
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Tian, Yu-Ping, Yu, Xinghou, and Chua, Leon O.
- Subjects
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CHAOS theory , *TIME delay systems , *STABILITY (Mechanics) , *HYBRID computer simulation , *COMPUTER systems , *DYNAMICS , *DIGITAL filters (Mathematics) , *MATHEMATICS - Abstract
This paper presents a time-delayed impulsive feedback approach to the problem of stabilization of periodic orbits in chaotic hybrid systems. The rigorous stability analysis of the proposed method is given. Using the time-delayed impulsive feedback method, we analyze the problem of detecting various periodic orbits in a special class of hybrid system, a switched arrival system, which is a prototype model of many manufacturing systems and computer systems where a large amount of work is processed in a unit time. We also consider the problem of stabilization of periodic orbits of chaotic piecewise affine systems, especially Chua's circuit, which is another important special class of hybrid systems. [ABSTRACT FROM AUTHOR]
- Published
- 2004
- Full Text
- View/download PDF
41. A COMPARATIVE STUDY OF MODEL SELECTION METHODS FOR NONLINEAR TIME SERIES.
- Author
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Nakamura, Tomomichi, Kilminster, Devin, Judd, Kevin, and Mees, Alistair
- Subjects
- *
MAXIMA & minima , *MATHEMATICS , *SIMULATED annealing , *COMBINATORIAL optimization , *NP-complete problems , *COMPUTATIONAL complexity , *SCIENCE - Abstract
Constructing models of nonlinear time series is typically NP-hard. One of the difficulties is the local minima, and it is difficult to find a global best model. Some methods have already been proposed that attempt to find good models with reasonable computation time. In this paper we propose new methods that can compensate for a drawback of a method previously proposed by Judd and Mees. A standard approach to NP-hard problems is simulated annealing. We apply these methods to build models of annual sunspot numbers and a laser time series, and compare the results. The results indicate that the performance of the proposed method is comparable to that of simulated annealing in both time series. The performance of Judd and Mees method is almost the same as that of the other methods for the annual sunspot data, but not as good for laser time series. The Judd and Mees method is computationally the fastest of all the methods, and the proposed method is faster than simulated annealing. [ABSTRACT FROM AUTHOR]
- Published
- 2004
- Full Text
- View/download PDF
42. RECONSTRUCTING DIFFERENTIAL EQUATION FROM A TIME SERIES.
- Author
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Petrov, Valko, Kurths, Juergen, and Georgiev, Nikola
- Subjects
- *
DIFFERENTIAL equations , *NOISE , *TIME series analysis , *MATHEMATICAL analysis , *MATHEMATICS , *ALGORITHMS - Abstract
This paper treats a problem of reconstructing ordinary differential equation from a single analytic time series with observational noise. We suppose that the noise is Gaussian (white). The investigation is presented in terms of classical theory of dynamical systems and modern time series analysis. We restrict our considerations on time series obtained as a numerical analytic solution of autonomous ordinary differential equation, solved with respect to the highest derivative and with polynomial right-hand side. In case of an approximate numerical solution with a rather small error, we propose a geometrical basis and a mathematical algorithm to reconstruct a low-order and low-power polynomial differential equation. To reduce the noise the given time series is smoothed at every point by moving polynomial averages using the least-squares method. Then a specific form of the least-squares method is applied to reconstruct the polynomial right-hand side of the unknown equation. We demonstrate for monotonous, periodic and chaotic solutions that this technique is very efficient. [ABSTRACT FROM AUTHOR]
- Published
- 2003
- Full Text
- View/download PDF
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