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DTSTART:20260329T030000
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DTSTAMP:20260705T154251Z
UID:CF08D074-02D5-4B90-AB28-692FE73538B1
DTSTART;TZID=Europe/Rome:20260709T093000
DTEND;TZID=Europe/Rome:20260710T221500
DESCRIPTION:On the Design of a High-Dimensional Hyperchaotic Hyperjerk Syst
 em with Multiple Positive Lyapunov Exponents: A Case Study\n\nThe study of
  hyperchaotic systems with multiple Lyapunov exponents is among the most f
 requently addressed topics in nonlinear physics. In this work\, we describ
 e a simple approach for the design of a hyperjerk-type\nhyperchaotic syste
 m with several positive Lyapunov exponents. As an illustration\, we consid
 er an eighthorder autonomous hyperjerk system with hyperbolic sinusoidal n
 onlinearity\, which has the advantage of being\nimplemented using a simple
  pair of semiconductor diodes connected in reverse parallel. The argument 
 of the hyperbolic sine function is a linear combination of judiciously cho
 sen system state variables. A detailed study\nis conducted\, focusing on d
 issipation\, equilibrium behavior\, bifurcation diagrams with correspondin
 g Lyapunov exponent graphs\, and the coexistence of attractors. Complexes 
 dynamics\, such as the hyperchaos with four positive Lyapunov exponents\, 
 dependent on the choice of system parameters\, are highlighted. An experim
 ental study\, using a suitable analog computer\, is carried out to verify/
 validate the results of the theoretical analysis. This work not only prese
 nts a novel hyperjerk-type hyperchaotic system but also underscores the pr
 actical applicability of theoretical findings through experimental validat
 ion. The results pave the way for further\nexploration of hyperchaotic sys
 tems and their potential applications in secure communications and complex
  dynamics.\n\nCastel Ivano\, Trentino-Alto Adige\, Italy
LOCATION:Castel Ivano\, Trentino-Alto Adige\, Italy
ORGANIZER:maide.bucolo@unict.it
SEQUENCE:8
SUMMARY:OPEN PLENARY @ COMPENG2026 Prof. Jacques Kengne
URL;VALUE=URI:https://events.vtools.ieee.org/m/566534
X-ALT-DESC:Description: &lt;br /&gt;&lt;p&gt;&lt;strong&gt;On the Design of a High-Dimensiona
 l Hyperchaotic Hyperjerk System with Multiple Positive Lyapunov Exponents:
  A Case Study&amp;nbsp\;&amp;nbsp\;&lt;/strong&gt;&lt;/p&gt;\n&lt;p&gt;The study of hyperchaotic sys
 tems with multiple Lyapunov exponents is among the most frequently address
 ed topics in nonlinear physics. In this work\, we describe a simple approa
 ch for the design of a hyperjerk-type&lt;br&gt;hyperchaotic system with several 
 positive Lyapunov exponents. As an illustration\, we consider an eighthord
 er autonomous hyperjerk system with hyperbolic sinusoidal nonlinearity\, w
 hich has the advantage of being&lt;br&gt;implemented using a simple pair of semi
 conductor diodes connected in reverse parallel. The argument of the hyperb
 olic sine function is a linear combination of judiciously chosen system st
 ate variables. A detailed study&lt;br&gt;is conducted\, focusing on dissipation\
 , equilibrium behavior\, bifurcation diagrams with corresponding Lyapunov 
 exponent graphs\, and the coexistence of attractors. Complexes dynamics\, 
 such as the hyperchaos with four positive Lyapunov exponents\, dependent o
 n the choice of system parameters\, are highlighted. An experimental study
 \, using a suitable analog computer\, is carried out to verify/validate th
 e results of the theoretical analysis.&amp;nbsp\; This work not only presents 
 a novel hyperjerk-type hyperchaotic system but also underscores the practi
 cal applicability of theoretical findings through experimental validation.
  The results pave the way for further&lt;br&gt;exploration of hyperchaotic syste
 ms and their potential applications in secure communications and complex d
 ynamics.&lt;/p&gt;
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