Title of article
Skew rank decompositions Original Research Article
Author/Authors
David A. Gregory، نويسنده , , Kevin N. Vander Meulen، نويسنده , , Bryan L. Shader، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 1996
Pages
32
From page
123
To page
154
Abstract
We study simple graphs G of order n for which every n by n skew-symmetric matrix A with support in the edge set of G can be expressed as the sum of (rank A)/2, rank two skew-symmetric matrices with supports also in the edge set of G. We say that such graphs support skew rank decompositions (s.r.d.ʹs). These graphs generalize the bipartite graphs of order m by n that support rank decompositions of m by n matrices. The latter have recently been shown to be the chordal bipartite graphs, a class of bipartite graphs that arises when Gaussian elimination is to be performed with restricted fill-in. We also introduce a generalization of chordal bipartite graphs that arise in Gaussian elimination of skew-symmetric matrices. Finally, we examine s.r.d.ʹs that conform with a given sign pattern and obtain a graphical characterization of the sign patterns that support such signed s.r.d.ʹs.
Journal title
Linear Algebra and its Applications
Serial Year
1996
Journal title
Linear Algebra and its Applications
Record number
821779
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