具有仿射等式和凸不等式约束的连续时间近似分布优化算法

IEEE Transactions on Systems Man and Cybernetics Part A-Systems and Humans Pub Date : 2021-09-01 DOI:10.1109/TSMC.2019.2957156

Xinrui Jiang, Sitian Qin, X. Xue

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引用次数: 19

摘要

研究了一类具有仿射等式和凸不等式约束的分布式优化问题。首先，放宽所考虑的DOP的一致性约束，并给出一个相关的近似DOP (ADOP)。证明了ADOP的最优解(即原DOP的近最优解)能够逼近原DOP的最优解。提出了一种ADOP的连续时间算法，并证明了该算法的状态解收敛于具有一般局部Lipschitz连续目标函数的ADOP的临界点集。这意味着所提出的算法对分布式非凸优化问题是有效的。特别地，当目标函数为凸函数时，进一步证明了该算法的状态解收敛于原DOP的近最优解。最后通过一个实例和一个负载分担问题的应用验证了该算法的有效性。

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Continuous-Time Algorithm for Approximate Distributed Optimization With Affine Equality and Convex Inequality Constraints

A distributed optimization problem (DOP) with affine equality and convex inequality constraints is studied in this article. First, the consensus constraint of the considered DOP is relaxed and a related approximate DOP (ADOP) is presented. It is proved that the optimal solutions of the ADOP (i.e., the near-optimal solutions of the original DOP) are able to approach the optimal solutions of the original DOP. A continuous-time algorithm is proposed for the ADOP and it is demonstrated that the state solution of the presented algorithm converges to the critical point set of the ADOP with general locally Lipschitz continuous objective functions. This means the presented algorithm is efficient for distributed nonconvex optimization problems. Particularly, when the objective functions are convex ones, the state solution of the presented algorithm is further proved to converge to a near-optimal solution of the original DOP. One illustrative example and an application on load sharing problems are shown to validate the effectiveness of the proposed algorithm.

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来源期刊

IEEE Transactions on Systems Man and Cybernetics Part A-Systems and Humans 工程技术-计算机：控制论

自引率

0.00%

发文量

审稿时长

6.0 months

期刊介绍： The scope of the IEEE Transactions on Systems, Man, and Cybernetics: Systems includes the fields of systems engineering. It includes issue formulation, analysis and modeling, decision making, and issue interpretation for any of the systems engineering lifecycle phases associated with the definition, development, and deployment of large systems. In addition, it includes systems management, systems engineering processes, and a variety of systems engineering methods such as optimization, modeling and simulation.