非凸约束优化的反射梯度朗格文动力学收敛误差分析

IF 0.7 4区 数学 Q3 MATHEMATICS, APPLIED
Kanji Sato, Akiko Takeda, Reiichiro Kawai, Taiji Suzuki
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引用次数: 0

摘要

梯度朗格文动力学及其各种变体因其向全局最优解的收敛性而受到越来越多的关注,最初是在无约束凸框架中,最近甚至在凸约束非凸问题中。在本研究中,我们将这些框架扩展到非凸可行区域上的非凸问题,并使用基于反射梯度朗格文动力学的全局优化算法,推导出其收敛率。通过有效利用其在边界上的反射,并结合具有诺伊曼边界条件的泊松方程的概率表示,我们提出了具有前景的收敛速率,尤其是比现有的凸约束非凸问题收敛速率更快。
本文章由计算机程序翻译,如有差异,请以英文原文为准。

Convergence error analysis of reflected gradient Langevin dynamics for non-convex constrained optimization

Convergence error analysis of reflected gradient Langevin dynamics for non-convex constrained optimization

Gradient Langevin dynamics and a variety of its variants have attracted increasing attention owing to their convergence towards the global optimal solution, initially in the unconstrained convex framework while recently even in convex constrained non-convex problems. In the present work, we extend those frameworks to non-convex problems on a non-convex feasible region with a global optimization algorithm built upon reflected gradient Langevin dynamics and derive its convergence rates. By effectively making use of its reflection at the boundary in combination with the probabilistic representation for the Poisson equation with the Neumann boundary condition, we present promising convergence rates, particularly faster than the existing one for convex constrained non-convex problems.

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来源期刊
CiteScore
1.50
自引率
11.10%
发文量
56
审稿时长
>12 weeks
期刊介绍: Japan Journal of Industrial and Applied Mathematics (JJIAM) is intended to provide an international forum for the expression of new ideas, as well as a site for the presentation of original research in various fields of the mathematical sciences. Consequently the most welcome types of articles are those which provide new insights into and methods for mathematical structures of various phenomena in the natural, social and industrial sciences, those which link real-world phenomena and mathematics through modeling and analysis, and those which impact the development of the mathematical sciences. The scope of the journal covers applied mathematical analysis, computational techniques and industrial mathematics.
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