Journal article
Schur complements of matrices with acyclic bipartite graphs
Bipartite graphs are used to describe the generalized Schur complements of real matrices having nos quare submatrix with two or more nonzero diagonals. For any matrix A with this property, including any nearly reducible matrix, the sign pattern of each generalized Schur complement is shown to be determined uniquely by the sign pattern of A.
Moreover, if A has a normalized LU factorization A = LU, then the sign pattern of A is shown to determine uniquely the sign patterns of L and U, and ( with the standard LU factorization) of L-1 and, if A is nonsingular, of U-1. However, if A is singular, then the sign pattern of the Moore-Penrose inverse U dagger may not be uniquely determined by the sign pattern of A.
Analogous results are shown to hold for zero patterns.
Language: | English |
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Publisher: | University of Wyoming Libraries |
Year: | 2005 |
Pages: | 2-11 |
ISSN: | 15379582 and 10813810 |
Types: | Journal article |
DOI: | 10.13001/1081-3810.1173 |