Resumen:
This work is dedicated to the economic scheduling of the required electric stations in the upcoming 10-year long-term plan. The calculation of the required electric stations is carried out by estimating the yearly consumption of electricity over a long-time plan and then determining the required number of stations. The aim is to minimize the total establishing and operating costs of the stations based on a mathematical programming model with nonlinear objective function and integer decision variables. The introduced model is applied for a real practical case study to conclude the number of yearly constructed stations over a long-term plan in the electricity sector in Jeddah City, Saudi Arabia. The current planning method is based only on intuition by constructing the same number of required stations in each year without searching for better solutions. To solve the introduced mathematical model, a novel recent gaining sharing knowledge-based algorithm, named GSK, has been used. The Augmented Lagrangian Method (ALM) is applied to transform the constrained formulation to become unconstrained with penalization to the objective function. According to the obtained results of the real case study, the proposed GSK with ALM approved an ability to solve this case with respect to convergence, efficiency, quality, and robustness.
Índice de impacto JCR y cuartil WoS: 2,833 - Q2 (2020); 1,700 - Q2 (2023)
Referencia DOI: https://doi.org/10.1155/2020/6675741
Publicado en papel: 2020.
Publicado on-line: Diciembre 2020.
Cita:
S.A. Hassan, K. Alnowibet, P. Agrawal, A.W. Mohamed, Optimum scheduling the electric distribution substations with a case study: an integer gaining-sharing knowledge-based metaheuristic algorithm. Complexity. Vol. 2020, pp. 6675741-1 - 6675741-13, 2020. [Online: Diciembre 2020]