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A SOCP Relaxation for Cycle Constraints in the Optimal Power Flow Problem

Arash Farokhi Soofi, Saeed D. Manshadi, Guangyi Liu, Renchang Dai

2020IEEE Transactions on Smart Grid44 citationsDOI

Abstract

This article presented a convex relaxation approach for the optimal power flow problem. The proposed approach leveraged the second-order cone programming (SOCP) relaxation to tackle the non-convexity within the feasible region of the power flow problem. Recovering an optimal solution that is feasible for the original non-convex problem is challenging for networks with cycles. The main challenge is the lack of convex constraints to present the voltage angles within a cycle. This article aims to fill this gap by presenting a convex constraint enforcing the sum of voltage angles over a cycle to be zero. To this end, the higher-order moment relaxation matrix associated with each maximal clique of the network is formed. The elements of this matrix are utilized to form a convex constraint enforcing the voltage angle summation over each cycle. To keep the computation burden of leveraging the higher-order moment relaxation low, a set of second-order cone constraints are applied to relate the elements of the higher-order moment relaxation matrix. The case study presented the merit of this work by comparing the solution procured by the introduced approach with other relaxation schemes.

Topics & Concepts

Relaxation (psychology)Mathematical optimizationMoment (physics)ConvexityConvex optimizationMathematicsSecond-order cone programmingRegular polygonMatrix (chemical analysis)GeometryPhysicsFinancial economicsComposite materialMaterials scienceClassical mechanicsEconomicsPsychologySocial psychologyOptimal Power Flow DistributionPower System Optimization and StabilitySmart Grid Energy Management
A SOCP Relaxation for Cycle Constraints in the Optimal Power Flow Problem | Litcius