Fractional-order systems without equilibria: The first example of hyperchaos and its application to synchronization

被引：48

作者：

Cafagna, Donato ^{[1
]}

Grassi, Giuseppe ^{[1
]}

机构：

[1] Univ Salento, Dipartimento Ingn Innovaz, I-73100 Lecce, Italy

来源：

CHINESE PHYSICS B | 2015年 / 24卷 / 08期

关键词：

fractional-order systems; equilibrium points; hyperchaotic systems; synchronization; CHAOTIC SYSTEM; CIRCUIT; BIFURCATION; ATTRACTOR; FLOWS;

D O I：

10.1088/1674-1056/24/8/080502

中图分类号：

O4 [物理学];

学科分类号：

0702 ;

摘要：

A challenging topic in nonlinear dynamics concerns the study of fractional-order systems without equilibrium points. In particular, no paper has been published to date regarding the presence of hyperchaos in these systems. This paper aims to bridge the gap by introducing a new example of fractional-order hyperchaotic system without equilibrium points. The conducted analysis shows that hyperchaos exists in the proposed system when its order is as low as 3.84. Moreover, an interesting application of hyperchaotic synchronization to the considered fractional-order system is provided.

引用

页数：9

共 52 条

[1]

Arena P, 2000, NONLINEAR NONINTEGER

[2]

Cafagna D, 2007, IEE IND ELECTRON M, V1, P35, DOI 10.1109/MIE.2007.901479

[3] BIFURCATION AND CHAOS IN THE FRACTIONAL-ORDER CHEN SYSTEM VIA A TIME-DOMAIN APPROACH [J].

Cafagna, Donato ;

Grassi, Giuseppe .

INTERNATIONAL JOURNAL OF BIFURCATION AND CHAOS, 2008, 18 (07) :1845-1863

[4] Fractional-order Chua's circuit: Time-domain analysis, bifurcation, chaotic behavior and test for chaos [J].

Cafagna, Donato ;

Grassi, Giuseppe .

INTERNATIONAL JOURNAL OF BIFURCATION AND CHAOS, 2008, 18 (03) :615-639

[5] Elegant Chaos in Fractional-Order System without Equilibria [J].

Cafagna, Donato ;

Grassi, Giuseppe .

MATHEMATICAL PROBLEMS IN ENGINEERING, 2013, 2013

[6] On the simplest fractional-order memristor-based chaotic system [J].

Cafagna, Donato ;

Grassi, Giuseppe .

NONLINEAR DYNAMICS, 2012, 70 (02) :1185-1197

[7] OBSERVER-BASED SYNCHRONIZATION FOR A CLASS OF FRACTIONAL CHAOTIC SYSTEMS VIA A SCALAR SIGNAL: RESULTS INVOLVING THE EXACT SOLUTION OF THE ERROR DYNAMICS [J].

Cafagna, Donato ;

Grassi, Giuseppe .

INTERNATIONAL JOURNAL OF BIFURCATION AND CHAOS, 2011, 21 (03) :955-962

[8] FRACTIONAL-ORDER CHAOS: A NOVEL FOUR-WING ATTRACTOR IN COUPLED LORENZ SYSTEMS [J].

Cafagna, Donato ;

Grassi, Giuseppe .

INTERNATIONAL JOURNAL OF BIFURCATION AND CHAOS, 2009, 19 (10) :3329-3338

[9] HYPERCHAOS IN THE FRACTIONAL-ORDER ROSSLER SYSTEM WITH LOWEST-ORDER [J].

Cafagna, Donato ;

Grassi, Giuseppe .

INTERNATIONAL JOURNAL OF BIFURCATION AND CHAOS, 2009, 19 (01) :339-347

[10] A semi-analytical method for the computation of the Lyapunov exponents of fractional-order systems [J].

Caponetto, Riccardo ;

Fazzino, Stefano .

COMMUNICATIONS IN NONLINEAR SCIENCE AND NUMERICAL SIMULATION, 2013, 18 (01) :22-27

← 1 2 3 4 5 6 →