K.Y. Nikravesh scite author profile

In this study, bifurcation and chaos phenomena in scalar drives of induction machines are investigated. Modified Poincare's map, Lyapunov exponents and bifurcation diagram are utilised for this purpose. The boundary related to bifurcated response and conditions of chaotic response is also acquired for this purpose using Poincare's map. In addition, root -locus curve of the system for stability and chaos analysis is derived by changing the controller parameters in constant speed control. In order to prove the chaotic response of the system, the largest Lyapunov's exponent is determined numerically. In addition, an experimental prototype is prepared to show these phenomena. It is shown that chaotic response of the system can be controlled by adjusting the critical values of the speed controller's gain value.

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Inherent Chaotic Behavior in Vector Control Drives of Induction Machines

Sangrody¹,

Nazarzadeh²,

Nikravesh³

2011

Electric Power Components and Systems

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Chaotic behaviour analysis in induction motors with scalar drive systems

Sangrody

Nazarzadeh

Nikravesh

2010

IJPEC

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K.Y. Nikravesh

Solution of the matrix Riccati equation for the linear quadratic control problems

Real-time estimation of vehicle state and tire-road friction forces

Bifurcation and Lyapunov's exponents characteristics of electrical scalar drive systems

Inherent Chaotic Behavior in Vector Control Drives of Induction Machines

Chaotic behaviour analysis in induction motors with scalar drive systems

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