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A second-order conic approximation to solving the optimal power flow problem in bipolar DC networks while considering a high penetration of distributed energy resources

Simón Sepúlveda-García, Oscar Danilo Montoya, Alejandro Garcés

2023International Journal of Electrical Power & Energy Systems13 citationsDOIOpen Access PDF

Abstract

This article presents an optimal power flow (OPF) formulation based on the branch flow model for bipolar DC grids with asymmetric loading. The proposal considers the power injection formulation of the OPF to obtain the branch flow model equations that allow solving the power flow problem in bipolar DC networks. Furthermore, a nonlinear programming (NLP) optimization model is deduced and transformed into a second-order conic programming one, which involves convex optimization and guarantees a global optimum for the relaxed model, the uniqueness of this solution, and fast convergence. Finally, an approximation based on balanced operation is proposed to simplify the OPF. Several case studies in two test systems composed of 21 and 85 nodes with a bipolar structure demonstrate that the proposal is accurate, fast, and close to the exact solution of the NLP model when compared with competitive literature reports. All optimization models were implemented in the Python language.

Topics & Concepts

Mathematical optimizationPower flowUniquenessNonlinear programmingComputer scienceConic sectionNonlinear systemElectric power systemPython (programming language)Power (physics)MathematicsQuantum mechanicsOperating systemPhysicsMathematical analysisGeometryMicrogrid Control and OptimizationOptimal Power Flow DistributionHVDC Systems and Fault Protection
A second-order conic approximation to solving the optimal power flow problem in bipolar DC networks while considering a high penetration of distributed energy resources | Litcius