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Cited by 16 publications
(15 citation statements)
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“…Due to the non-repetition of chaos, chaotic sequence carries out overall search at higher speed than stochastic ergodic search that depends on the probabilities [34,35]. Notably, a lot of existing optimization results demonstrated that chaotic sequences escape from local minima more easily than evolutionary algorithms including GA, SA, PSO, ACO, and DE so on [36].…”
Section: Proposed Caro Techniquementioning
confidence: 94%
“…Due to the non-repetition of chaos, chaotic sequence carries out overall search at higher speed than stochastic ergodic search that depends on the probabilities [34,35]. Notably, a lot of existing optimization results demonstrated that chaotic sequences escape from local minima more easily than evolutionary algorithms including GA, SA, PSO, ACO, and DE so on [36].…”
Section: Proposed Caro Techniquementioning
confidence: 94%
“…Several ChOA applications and variants can also be found in the literature (Lu et al 2006;Tavazoei and Haeri 2007a, b;Yang et al , 2012Han and Lu 2008;Cheshomi et al 2010;Henao 2011;Jiang et al 2012;Hamaizia et al 2012;Yuan et al 2012;Bouras and Syam 2013;Shayeghi et al 2009). To implement the ChOA algorithm, the following steps need to be performed (Li and Jiang 1998;Cheshomi et al 2010):…”
Section: Fundamentals Of Chaos Optimization Algorithmmentioning
confidence: 95%
“…Due to non-repetitive nature of chaos, it can carry out overall searches at higher speeds than stochastic ergodic searches that is probabilistic in nature [20]. From chaotic sequence-based optimization techniques [19][20][21][22][23][24][25][26][27]30,31], the convergence of chaotic sequence-based techniques has better capacity than that of stochastic sequences. The main reason is due to the properties of ergodicity, pseudo randomness and non-repetition of chaotic sequences.…”
Section: Proposed Caro Techniquementioning
confidence: 97%
“…Chaos has a bounded unstable dynamic behavior and exhibits sensitive dependence on its initial conditions [19]. Due to non-repetitive nature of chaos, it can carry out overall searches at higher speeds than stochastic ergodic searches that is probabilistic in nature [20].…”
Section: Introductionmentioning
confidence: 99%