Random block-coordinate methods for inconsistent convex optimisation problems

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Fixed point theory and algorithms for sciences and engineering Pub Date : 2023-11-06 DOI:10.1186/s13663-023-00751-0

Mathias Staudigl, Paulin Jacquot

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Abstract

Abstract We develop a novel randomised block-coordinate primal-dual algorithm for a class of non-smooth ill-posed convex programs. Lying midway between the celebrated Chambolle–Pock primal-dual algorithm and Tseng’s accelerated proximal gradient method, we establish global convergence of the last iterate as well as optimal $O(1/k)$ O ( 1 / k ) and $O(1/k^{2})$ O ( 1 / k 2 ) complexity rates in the convex and strongly convex case, respectively, k being the iteration count. Motivated by the increased complexity in the control of distribution-level electric-power systems, we test the performance of our method on a second-order cone relaxation of an AC-OPF problem. Distributed control is achieved via the distributed locational marginal prices (DLMPs), which are obtained as dual variables in our optimisation framework.

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非一致凸优化问题的随机块坐标方法

摘要针对一类非光滑病态凸规划，提出了一种新的随机块坐标原对偶算法。在著名的Chambolle-Pock原始对偶算法和Tseng加速近端梯度法之间，我们分别在凸和强凸情况下建立了最后一次迭代的全局收敛性以及最优的$O(1/k)$ O(1/k)和$O(1/k^{2})$ O(1/k)复杂度率，k为迭代计数。由于配电级电力系统控制的复杂性日益增加，我们在AC-OPF问题的二阶锥松弛上测试了我们的方法的性能。分布式控制是通过分布式位置边际价格(DLMPs)来实现的，它在我们的优化框架中作为双变量获得。

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Fixed point theory and algorithms for sciences and engineering

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