Litcius/Paper detail

A Basic AC Power Flow Based on the Bus Admittance Matrix Incorporating Loads and Generators Including Slack Bus

Roberto Benato

2021IEEE Transactions on Power Systems19 citationsDOIOpen Access PDF

Abstract

This paper presents an algorithm for solving the AC basic power flow based on some enrichments provided in the bus admittance matrix methods findable in the literature. In particular, the interpretation of the slack bus generator as a current source rather than a voltage one and its inclusion inside an “all-inclusive” admittance matrix allows obtaining strong performances of the algorithm. In fact, this method gives both a well conditioning of the admittance matrix and the reduction of matrix partitioning for each iteration. As a result, a greater precision of the solution, a shorter execution time compared to classical commercial methods, a decreasing number of iterations and optimal convergence properties are obtained. Eventually, in order to show the efficiency of the method, real and fictious networks are tested, by comparing its results and performances with robust open source/commercial software packages that use well-known methods ( <italic xmlns:mml="http://www.w3.org/1998/Math/MathML" xmlns:xlink="http://www.w3.org/1999/xlink">i.e.</i> , Newton-Raphson and Fast Decoupled Load Flow methods).

Topics & Concepts

Admittance parametersAdmittanceMatrix (chemical analysis)Generator (circuit theory)Convergence (economics)Computer scienceNewton's methodSlack busPower (physics)Control theory (sociology)Reduction (mathematics)AlgorithmVoltageMathematical optimizationTopology (electrical circuits)AC powerPower-flow studyMathematicsElectrical engineeringEngineeringPhysicsControl (management)GeometryEconomic growthEconomicsArtificial intelligenceComposite materialElectrical impedanceNonlinear systemMaterials scienceQuantum mechanicsOptimal Power Flow DistributionMicrogrid Control and OptimizationPower System Optimization and Stability