Generalization of the Simplest
Autonomous Chaotic System
Buncha Munmuangsaena,
Banlue Srisuchinwonga, J.C. Sprottb
aSirindhorn International
Institute of Technology (SIIT), Thammasat University, Pathum-Thani
12000, Thailand
bDepartment of Physics,
University of Wisconsin, Madison, WI 53706, USA
Received 19 October 2010, Received in revised form 7 February 2011,
Accepted 12 February 2011, Available online 16 February 2011
ABSTRACT
An extensive numerical search of jerk systems of the form x''' + x'' + x = f (x')
revealed
many cases with chaotic solutions in addition to the one with f (x')
=
x'2 that has
long been known. Particularly simple is the piecewise-linear case with f (x')
=
α(1− x') for x' > 1 and zero otherwise,
which produces chaos even in the limit of α→∞. The dynamics in this limit can
be calculated exactly, leading to a two-dimensional map. Such a
nonlinearity suggests an elegant electronic circuit implementation
using a single diode.
Ref: B. Munmuangsaen, B. Srisuchinwong, and J.C. Sprott,
Phys. Lett. A 375, 1445-1450 (2011)
The complete paper is available in PDF
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Fig. 1. Attractors of Eq. (3) for each of the nonlinear functions in
Table 1.
Fig. 2. The largest Lyapunov exponent and bifurcation diagram of Eq.
(3) for
f (
x') = −
A exp(
x') with 0 <
A < 0.5.
Fig. 3. Homoclinic orbit in Eq. (3) for
f (
x')
= −
A exp(
x') with
A = 0.1306.
Fig. 4. Attractor for the piecewise-linear system.
Fig. 5. Poincaré section at
x'
= 0 for the piecewise-linear system.
Fig. 6. Return map for the maximum value of
x for the piecewise-linear system.
