"10.1063/1.4768987" . "American Institute of Physics" . . . . "P(ED2.1.00/03.0089)" . . . "7"^^ . "Synthesis of Feedback Control Law for Stabilization of Chaotic System Oscillations by Means of Analytic Programming - Preliminary Study"@en . "Melville" . "172960" . . "evolutionary algorithms; optimization; Analytic programming; Chaos Control"@en . . "5"^^ . . "Zelinka, Ivan" . "2012-08-06+02:00"^^ . . "Davendra, Donald" . "Ja\u0161ek, Roman" . "Proceedings Of The Sixth Global Conference On Power Control And Optimization" . "\u0160enke\u0159\u00EDk, Roman" . . "[9AB78F1C6B37]" . "Synthesis of Feedback Control Law for Stabilization of Chaotic System Oscillations by Means of Analytic Programming - Preliminary Study"@en . "RIV/70883521:28140/12:43868193!RIV13-MSM-28140___" . "3"^^ . "000312409000026" . "This research deals with a synthesis of control law for selected discrete chaotic system - logistic equation by means of analytic programming. The novelty of the approach is that a tool for symbolic regression - analytic programming - is used for the purpose of stabilization of higher periodic orbits - oscillations between several values of chaotic system. The paper consists of the descriptions of analytic programming as well as used chaotic system and detailed proposal of cost function used in optimization process. For experimentation, Self-Organizing Migrating Algorithm (SOMA) with analytic programming and Differential evolution (DE) as second algorithm for meta-evolution were used." . . "Oplatkov\u00E1, Zuzana" . . "28140" . . . . . "0094-243X" . "Las Vegas,Nevada" . "978-0-7354-1113-5" . . . "Synthesis of Feedback Control Law for Stabilization of Chaotic System Oscillations by Means of Analytic Programming - Preliminary Study" . "RIV/70883521:28140/12:43868193" . "This research deals with a synthesis of control law for selected discrete chaotic system - logistic equation by means of analytic programming. The novelty of the approach is that a tool for symbolic regression - analytic programming - is used for the purpose of stabilization of higher periodic orbits - oscillations between several values of chaotic system. The paper consists of the descriptions of analytic programming as well as used chaotic system and detailed proposal of cost function used in optimization process. For experimentation, Self-Organizing Migrating Algorithm (SOMA) with analytic programming and Differential evolution (DE) as second algorithm for meta-evolution were used."@en . . . "Synthesis of Feedback Control Law for Stabilization of Chaotic System Oscillations by Means of Analytic Programming - Preliminary Study" .