Global cluster geometry optimization by a phenotype algorithm with Niches: Location of elusive minima, and low-order scaling with cluster size

Hartke, Bernd

doi:10.1002/(sici)1096-987x(199912)20:16<1752::aid-jcc7>3.0.co;2-0

Cited by 186 publications

(151 citation statements)

References 56 publications

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“…In the past few years, a couple of approaches 11,12,42 were developed to deal with this double-funnel problem in a more efficient way. The technique introduced by Hartke 42 uses a parameter which controls the diversity of structural types in the population of the GA, preventing it from generating only icosahedral structures.…”

Section: Difficult Cases For Global Optimizationmentioning

confidence: 99%

“…The technique introduced by Hartke 42 uses a parameter which controls the diversity of structural types in the population of the GA, preventing it from generating only icosahedral structures. In turn, Locatelli and Schoen 11,12 have proposed a transformation in the potential energy surface, so that the nonicosahedral global minima are much more likely to be found.…”

Section: Difficult Cases For Global Optimizationmentioning

confidence: 99%

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On the Use of Different Potential Energy Functions in Rare-Gas Cluster Optimization by Genetic Algorithms: Application to Argon Clusters

Marques¹,

Pereira²,

Leitão³

2008

J. Phys. Chem. A

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We study the effect of the potential energy function on the global minimum structures of argon clusters arising in the optimization performed by genetic algorithms (GAs). We propose a robust and efficient GA which allows for the calculation of all of the putative global minima of Ar N (N ) 3-78) clusters modeled with four different potentials. Both energetic and structural properties of such minima are compared among each other and with those previously obtained for the Lennard-Jones function. In addition, the possibility of obtaining global minima of one potential through local optimization over the corresponding cluster geometry given by other potentials was associated with some structural parameters. The influence of the contribution from the three-body (Axilrod-Teller-Muto) triple-dipole potential (including or not a damping function to describe its correct behavior at smaller interatomic distances) has also been analyzed.

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Section: Difficult Cases For Global Optimizationmentioning

confidence: 99%

Section: Difficult Cases For Global Optimizationmentioning

confidence: 99%

On the Use of Different Potential Energy Functions in Rare-Gas Cluster Optimization by Genetic Algorithms: Application to Argon Clusters

Marques¹,

Pereira²,

Leitão³

2008

J. Phys. Chem. A

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“…However, this jumping may induce the uphill moves which assist in the exploration of the next valley separated from the previous valley by a high barrier, and our BHOJ can successfully find out the lowest-energy structure at approximately 1400 steps. In comparison to the various sophisticated methods [21,22,23,24,25], our basinhopping with occasional jumping (BHOJ) is intuitively appealing and simple to implement. The performance of the algorithm seems better than most of the above algorithms.…”

Section: Methodsmentioning

confidence: 99%

“…[23,27] were also successfully located by our BHOJ though the success rates of these three cases were very low.…”

Section: Methodsmentioning

confidence: 99%

Basin hopping with occasional jumping

Iwamatsu

Okabe

2004

Chemical Physics Letters

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Basin-Hopping (BH) or Monte-Carlo Minimization (MCM) is so far the most reliable algorithms in chemical physics to search for the lowest-energy structure of atomic clusters and macromolecular systems. BH transforms the complex energy landscape into a collection of basins, and explores them by hopping, which is achieved by random Monte Carlo moves and acceptance/rejection using the Metropolis criterion. In this report, we introduce the jumping process in addition to the hopping process in BH. Jumping are invoked when the hopping stagnates by reaching the local optima, and are achieved using the Monte Carlo move at the temperature T = ∞ without rejection. Our Basin-Hopping with Occasional Jumping (BHOJ) algorithm is applied to the Lennard-Jones clusters of several notoriously difficult sizes. It was found that the probability of locating the true global optima using BHOJ is significantly higher than the original BH.

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“…Merging lower energy halves of two nanoparticles would increases the fitness of emerging child. 10-20% efficiency increment is observed in the study of Hartke [40] by the usage of this enhancement in the application of cut and splice crossover.…”

Section: Phenotype Genetic Operations For Geometry Optimization Problemmentioning

confidence: 99%

Genetic Algorithms in Application to the Geometry Optimization of Nanoparticles

Dugan

Erkoç

2009

Algorithms

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Applications of genetic algorithms to the global geometry optimization problem of nanoparticles are reviewed. Genetic operations are investigated and importance of phenotype genetic operations, considering the geometry of nanoparticles, are mentioned. Other efficiency improving developments such as floating point representation and local relaxation are described broadly. Parallelization issues are also considered and a recent parallel working single parent Lamarckian genetic algorithm is reviewed with applications on carbon clusters and SiGe core-shell structures.

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Global cluster geometry optimization by a phenotype algorithm with Niches: Location of elusive minima, and low-order scaling with cluster size

Cited by 186 publications

References 56 publications

On the Use of Different Potential Energy Functions in Rare-Gas Cluster Optimization by Genetic Algorithms: Application to Argon Clusters

On the Use of Different Potential Energy Functions in Rare-Gas Cluster Optimization by Genetic Algorithms: Application to Argon Clusters

Basin hopping with occasional jumping

Genetic Algorithms in Application to the Geometry Optimization of Nanoparticles

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