基于有效集的不精确近端束算法用于随机二次规划

Active set-based inexact proximal bundle algorithm for stochastic quadratic programming

Computational Optimization and Applications · 2025
被引 0
ABS 3

中文导读

针对大规模两阶段随机二次规划问题,提出两种不精确近端束算法,通过重用解信息降低计算成本,并在电力系统规划问题中验证了其高效性。

Abstract

Abstract In this paper, we examine two-stage stochastic quadratic programming problems, where the objective functions of the first and second stages are quadratic, and the constraints are linear. The uncertainty is associated with the second-stage right-hand side and variable bounds. In large-scale settings, when the number of scenarios necessary to represent the underlying stochastic process is exuberantly large, standard decomposition-based methods that require the exact solutions are computationally prohibitive. To address this issue, we develop two inexact proximal bundle algorithms that rely on the efficient reuse of solution information. The first algorithm utilizes a collection of previously encountered second-stage dual solutions to construct inexact minorants for the expectation-valued objective function. On the other hand, a partition-based inexact proximal bundle algorithm utilizes the optimal active sets obtained in earlier iterations, along with a primal-dual active set method, to construct the inexact minorant. For both these variants, we establish their asymptotic convergence to optimal solutions. Using a carefully developed computer implementation, we demonstrate the practical behavior of these algorithms through numerical experiments conducted on power systems planning and operations problems. The results indicate that the partition-based algorithm consistently identifies solutions of comparable quality to those obtained from exact algorithms, while significantly reducing computational time.

随机规划二次规划优化算法电力系统规划