Two algorithms for obtaining sparse loop matrices

Two algorithms for obtaining sparse loop matrices

This paper deals with the problem of obtaining a linearly independent set of loop matrix equations, whose nonzero pattern is as sparse as possible. Unlike existing procedures, based on trees and associated fundamental loops, the two algorithms proposed in this paper attempt to find as short as possi...

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Veröffentlicht in:IEEE transactions on power systems 2006-02, Vol.21 (1), p.125-131
Hauptverfasser: Exposito, A.G., Ramos, E.R., Godino, M.D.
Format: Artikel
Sprache:eng
Schlagworte:
Admittance
Algorithms
Benchmarking
Electronics packaging
Equations
Flexibility
Graphs
Linear circuits
Links
Load flow
Logic programming
loop matrix
Mathematical analysis
Matrices
Matrix methods
Observability
Searching
Sparse matrices
sparsity
Tree graphs
Voltage
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Beschreibung
Zusammenfassung:This paper deals with the problem of obtaining a linearly independent set of loop matrix equations, whose nonzero pattern is as sparse as possible. Unlike existing procedures, based on trees and associated fundamental loops, the two algorithms proposed in this paper attempt to find as short as possible loops by means of systematic breadth-first searches. Linear independence of the resulting loops is assured by forcing each loop to contain a characteristic branch that cannot belong to future or past loops, respectively. Such a branch plays the role of links in fundamental loops, providing more flexibility in the way loops are closed. Experimental results on benchmark systems show that the proposed methods yield loop matrices that are much sparser than those provided by existing methods.
ISSN:0885-8950
1558-0679
DOI:10.1109/TPWRS.2005.857848