Please use this identifier to cite or link to this item: https://hdl.handle.net/10953/2969
Title: On Optimal Settings for a Family of Runge–Kutta-Based Power-Flow Solvers Suitable for Large-Scale Ill-Conditioned Cases
Authors: Tostado-Véliz, Marcos
Alharbi, Talal
Alharbi, Hisham
Kamel, Salah
Jurado-Melguizo, Francisco
Abstract: Growing demand, interconnection of multiple systems, and difficulty in upgrading existing infrastructures are limiting the capabilities of conventional computational tools employed in power system analysis. Recent studies manifest the importance of efficiently solving well- and ill-conditioned Power-Flow cases in a modern power-system paradigm. While the well-conditioned cases are easily solvable using standard methods, the ill-conditioned ones suppose a challenge for such solvers. In this regard, methods based on the Continuous Newton’s principle have demonstrated their ability to address ill-conditioned cases with acceptable efficiency. This paper demonstrates that the approaches proposed so far do not extract the best numerical properties of such solvers. To fill this gap, an optimization framework is proposed by which the parameters involved in the two-stage Runge–Kutta-based solvers are appropriately set, so that the stability and convergence order of the numerical mapping are maximized. By using the developed optimization technique, three solvers with quadratic, cubic, and 4th order of convergence are developed. The new proposals are tested on a variety of large-scale ill-conditioned cases. Results obtained were promising, outperforming other conventional and robust approaches.
Keywords: Power-flow analysis
Large-scale systems
Continous Newton's method
Runge-Kutta formula
Order of convergence
Computational efficiency
Numerical stability
Issue Date: Apr-2022
Publisher: MDPI
Citation: Tostado-Véliz, M.; Alharbi, T.; Alharbi, H.; Kamel, S.; Jurado, F. On Optimal Settings for a Family of Runge–Kutta-Based Power-Flow Solvers Suitable for Large-Scale Ill-Conditioned Cases. Mathematics 2022, 10, 1279. https://doi.org/10.3390/math10081279
Appears in Collections:DIE-Artículos

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