Polarized consensus-based dynamics for optimization and sampling

IF 4.6 Q2 MATERIALS SCIENCE, BIOMATERIALS
Leon Bungert, Tim Roith, Philipp Wacker
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引用次数: 0

Abstract

In this paper we propose polarized consensus-based dynamics in order to make consensus-based optimization (CBO) and sampling (CBS) applicable for objective functions with several global minima or distributions with many modes, respectively. For this, we “polarize” the dynamics with a localizing kernel and the resulting model can be viewed as a bounded confidence model for opinion formation in the presence of common objective. Instead of being attracted to a common weighted mean as in the original consensus-based methods, which prevents the detection of more than one minimum or mode, in our method every particle is attracted to a weighted mean which gives more weight to nearby particles. We prove that in the mean-field regime the polarized CBS dynamics are unbiased for Gaussian targets. We also prove that in the zero temperature limit and for sufficiently well-behaved strongly convex objectives the solution of the Fokker–Planck equation converges in the Wasserstein-2 distance to a Dirac measure at the minimizer. Finally, we propose a computationally more efficient generalization which works with a predefined number of clusters and improves upon our polarized baseline method for high-dimensional optimization.

Abstract Image

基于共识的极化动态优化和抽样
在本文中,我们提出了基于极化共识的动力学,以便使基于共识的优化(CBO)和采样(CBS)分别适用于具有多个全局最小值或具有多种模式分布的目标函数。为此,我们用一个局部化核对动力学进行了 "极化",由此产生的模型可被视为在存在共同目标的情况下形成意见的有界置信模型。在我们的方法中,每个粒子都会被一个加权平均值所吸引,而不是像最初的基于共识的方法那样被一个共同的加权平均值所吸引,因为后者会阻止检测到一个以上的最小值或模式。我们证明,在均场机制下,对于高斯目标,极化 CBS 动力学是无偏的。我们还证明,在零温度极限和充分良好的强凸目标下,福克-普朗克方程的解在瓦瑟斯坦-2 距离上收敛于最小值处的狄拉克量纲。最后,我们提出了一种计算效率更高的广义方法,它可以使用预定义的簇数,并改进了我们的高维优化极化基线方法。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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来源期刊
ACS Applied Bio Materials
ACS Applied Bio Materials Chemistry-Chemistry (all)
CiteScore
9.40
自引率
2.10%
发文量
464
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