A new multistage and multiscale stochastic programming approach is developed by Dr. Zhouchun Huang for power system capacity expansion problem, and a nested cross decomposition algorithm is designed to address the computational challenge of the proposed model. The work is recently published in INFORMS Journal on Computing (IJOC), one of the top 24 leading business journals (UTD24). IJOC publishes high quality papers that expand the envelope of operations research and computing, and seeks original research papers on relevant theories, methods, experiments, systems, and applications. The abstract of the paper is copied below.
Modern electric power systems have witnessed rapidly increasing penetration of renewable energy, storage, electrical vehicles, and various demand response resources. The electric infrastructure planning is thus facing more challenges as a result of the variability and uncertainties arising from the diverse new resources. This study aims to develop a multistage and multiscale stochastic mixed integer programming (MM-SMIP) model to capture both the coarse-temporal-scale uncertainties, such as investment cost and long-run demand stochasticity, and fine-temporal-scale uncertainties, such as hourly renewable energy output and electricity demand uncertainties, for the power system capacity expansion problem. To be applied to a real power system, the resulting model will lead to extremely large-scale mixed integer programming problems, which suffer not only the well-known curse of dimensionality but also computational difficulties with a vast number of integer variables at each stage. In addressing such challenges associated with the MM-SMIP model, we propose a nested cross decomposition algorithm that consists of two layers of decomposition—that is, the Dantzig–Wolfe decomposition and L-shaped decomposition. The algorithm exhibits promising computational performance under our numerical study and is especially amenable to parallel computing, which will also be demonstrated through the computational results.
Figure: Hybrid Here-and-Now and Wait-and-See Modeling
If you are interested in the research, please read the paper:
Zhouchun Huang, Qipeng P. Zheng, Andrew L. Liu (2022) A Nested Cross Decomposition Algorithm for Power System Capacity Expansion with Multiscale Uncertainties. INFORMS Journal on Computing, In Press, DOI: 10.1287/ijoc.2022.1177.
A full version of this article could be viewed at:
https://pubsonline.informs.org/doi/10.1287/ijoc.2022.1177.
Nanjing University of Aeronautics and Astronautics
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