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SIAMREV
2010

On the Block Triangular Form of Symmetric Matrices

13 years 7 months ago
On the Block Triangular Form of Symmetric Matrices
We present some observations on the block triangular form (btf) of structurally symmetric, square, sparse matrices. If the matrix is structurally rank deficient, its canonical btf has at least one underdetermined and one overdetermined block. We prove that these blocks are transposes of each other. We further prove that the square block of the canonical btf, if present, has a special fine structure. These findings help us recover symmetry around the antidiagonal in the block triangular matrix. The uncovered symmetry helps us to permute the matrix in a special form which is symmetric along the main diagonal while exhibiting the blocks of the original btf. As the square block of the canonical btf has full structural rank, the observation relating to the square block applies to structurally nonsingular, square symmetric matrices as well. Key words. sparse matrices, block triangular form, Dulmage
Iain S. Duff, Bora Uçar
Added 21 May 2011
Updated 21 May 2011
Type Journal
Year 2010
Where SIAMREV
Authors Iain S. Duff, Bora Uçar
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