Please use this identifier to cite or link to this item: http://repositorio.unicamp.br/jspui/handle/REPOSIP/60125
Type: Artigo de periódico
Title: Inertias of block band matrix completions
Author: Cohen, N
Dancis, J
Abstract: The full set of completion inertias is described in terms of seven linear inequalities involving inertias and ranks of specified submatrices. The minimal completion rank for P is computed. We study the completion inertias of partially specified hermitian block band matrices, using a block generalization of the Dym-Gohberg algorithm. At each inductive step, we use our classification of the possible inertias for hermitian completions of bordered matrices. We show that when all the maximal specified submatrices are invertible, any inertia consistent with Poincare's inequalities is obtainable. These results generalize the nonblock band results of Dancis [SIAM J. Matrix Anal. Appl., 14 (1993), pg 813-829]. All our results remain valid for real symmetric completions.
Subject: matrices
hermitian
rank
inertia
completion
minimal rank
Country: EUA
Editor: Siam Publications
Rights: aberto
Identifier DOI: 10.1137/S0895479895296471
Date Issue: 1998
Appears in Collections:Artigos e Materiais de Revistas Científicas - Unicamp

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