拉格朗日松弛结合微分进化算法求解机组承诺问题

T. Sum-Im
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引用次数: 5

摘要

本文提出了一种将拉格朗日松弛法(LR)与差分进化算法(DEA)相结合的方法(LR-DEA)来解决火电厂机组投入问题。DEA方法的优点是具有并行搜索和优化能力。机组承诺问题被表述为性能指标的最小化,该指标是目标(燃料成本、启动成本)和若干等式和不等式约束(功率平衡、发电机限制、旋转储备、最小启动/停机时间)的总和。通过对10单元测试系统的分析,初步证明了所提出技术的效率和有效性。对传统LR、遗传算法(GA)、进化规划(EP)、拉格朗日松弛与遗传算法的混合(LRGA)、蚁群搜索算法(ACSA)进行了详细的比较研究,并提出了该方法。实验结果表明,该方法具有求解精度高、收敛特性稳定、实现简单、计算时间满意等优点。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Lagrangian relaxation combined with differential evolution algorithm for unit commitment problem
In this paper, a technique of combining Lagrangian relaxation (LR) with a differential evolution algorithm (DEA) method (LR-DEA) is proposed for solving unit commitment (UC) problem of thermal power plants. The merits of DEA method are parallel search and optimization capabilities. The unit commitment problem is formulated as the minimization of a performance index, which is sum of objectives (fuel cost, start-up cost) and several equality and inequality constraints (power balance, generator limits, spinning reserve, minimum up/down time). The efficiency and effectiveness of the proposed technique is initially demonstrated via the analysis of 10-unit test system. A detailed comparative study among the conventional LR, genetic algorithm (GA), evolutionary programming (EP), a hybrid of Lagrangian relaxation and genetic algorithm (LRGA), ant colony search algorithm (ACSA), and the proposed method is presented. From the experimental results, the proposed method has high accuracy of solution achievement, stable convergence characteristics, simple implementation and satisfactory computational time.
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