Hui Huang scite author profile

We introduce a new stochastic differential model for global optimization of nonconvex functions on compact hypersurfaces. The model is inspired by the stochastic Kuramoto–Vicsek system and belongs to the class of Consensus-Based Optimization methods. In fact, particles move on the hypersurface driven by a drift towards an instantaneous consensus point, computed as a convex combination of the particle locations weighted by the cost function according to Laplace’s principle. The consensus point represents an approximation to a global minimizer. The dynamics is further perturbed by a random vector field to favor exploration, whose variance is a function of the distance of the particles to the consensus point. In particular, as soon as the consensus is reached, then the stochastic component vanishes. In this paper, we study the well-posedness of the model and we derive rigorously its mean-field approximation for large particle limit.

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Error estimate of a random particle blob method for the Keller-Segel equation

Huang

Liu²

2017

Math. Comp.

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Water soluble corrosion inhibitors for copper in 3.5 wt% sodium chloride solution

et al. 2017

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Preparation of cubic Cu2O nanoparticles wrapped by reduced graphene oxide for the efficient removal of rhodamine B

Huang

Zhang

Lian

et al. 2017

Journal of Alloys and Compounds

259

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Hui Huang

Consensus-based optimization on hypersurfaces: Well-posedness and mean-field limit

Error estimate of a random particle blob method for the Keller-Segel equation

Water soluble corrosion inhibitors for copper in 3.5 wt% sodium chloride solution

Preparation of cubic Cu2O nanoparticles wrapped by reduced graphene oxide for the efficient removal of rhodamine B

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