2021
DOI: 10.11591/eei.v10i1.2667
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Signature PSO: A novel inertia weight adjustment using fuzzy signature for LQR tuning

Abstract: Particle swarm optimization (PSO) is an optimization algorithm that is simple and reliable to complete optimization. The balance between exploration and exploitation of PSO searching characteristics is maintained by inertia weight. Since this parameter has been introduced, there have been several different strategies to determine the inertia weight during a train of the run. This paper describes the method of adjusting the inertia weights using fuzzy signatures called signature PSO. Some parameters were used a… Show more

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Cited by 8 publications
(1 citation statement)
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“…where I(i, t) denotes the ith particle at the time t position function, X denotes the total number of particles passing through the binomial probability improvement position, p denotes the improvement success probability, q denotes the failure probability, the particle swarm is independent of each other, and p = q = 0.5. Komarudin et al [77] combined the multi-dimensional direct fuzzy signature, parametric feedback success counter, and CBPE methods to transform the fuzzy process into aggregation equations for the adaptive updating of inertia weights. Equation (38) represents the structural hierarchy of the inertia weights, Equation (39) represents the best particle to reach the minimization goal, Equation (40) represents the best particle percentage, Equation (41) represents the particle distribution in the search space, and Equation ( 42) represents the NCBPE normalization process for measuring the best fitness value of the solution:…”
Section: Algorithm Parameter Optimizationmentioning
confidence: 99%
“…where I(i, t) denotes the ith particle at the time t position function, X denotes the total number of particles passing through the binomial probability improvement position, p denotes the improvement success probability, q denotes the failure probability, the particle swarm is independent of each other, and p = q = 0.5. Komarudin et al [77] combined the multi-dimensional direct fuzzy signature, parametric feedback success counter, and CBPE methods to transform the fuzzy process into aggregation equations for the adaptive updating of inertia weights. Equation (38) represents the structural hierarchy of the inertia weights, Equation (39) represents the best particle to reach the minimization goal, Equation (40) represents the best particle percentage, Equation (41) represents the particle distribution in the search space, and Equation ( 42) represents the NCBPE normalization process for measuring the best fitness value of the solution:…”
Section: Algorithm Parameter Optimizationmentioning
confidence: 99%