Disc Separation of the Schur Complement of Diagonally Dominant Matrices and Determinantal Bounds

Jianzhou Liu; Fuzhen Zhang

doi:10.1137/040620369

Disc Separation of the Schur Complement of Diagonally Dominant Matrices and Determinantal Bounds

Jianzhou Liu
, Fuzhen Zhang

Department of Mathematics

Research output: Contribution to journal › Article › peer-review

53 Scopus citations

Abstract

We consider the Gersgorin disc separation from the origin for (doubly) diagonally dominant matrices and their Schur complements, showing that the separation of the Schur complement of a (doubly) diagonally dominant matrix is greater than that of the original grand matrix. As application we discuss the localization of eigenvalues and present some upper and lower bounds for the determinant of diagonally dominant matrices.

Original language	American English
Journal	SIAM Journal on Matrix Analysis and Applications
Volume	27
DOIs	https://doi.org/10.1137/040620369
State	Published - Dec 1 2005

Keywords

Brauer theorem
Comparison matrix
Diagonally dominant matrix
Doubly diagonally dominant matrix
Gersgorin theorem
H-matrix
M-matrix
Schur complement
Separation

Disciplines

Mathematics

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title = "Disc Separation of the Schur Complement of Diagonally Dominant Matrices and Determinantal Bounds",

abstract = " We consider the Gersgorin disc separation from the origin for (doubly) diagonally dominant matrices and their Schur complements, showing that the separation of the Schur complement of a (doubly) diagonally dominant matrix is greater than that of the original grand matrix. As application we discuss the localization of eigenvalues and present some upper and lower bounds for the determinant of diagonally dominant matrices.",

keywords = "Brauer theorem, Comparison matrix, Diagonally dominant matrix, Doubly diagonally dominant matrix, Gersgorin theorem, H-matrix, M-matrix, Schur complement, Separation",

author = "Jianzhou Liu and Fuzhen Zhang",

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doi = "10.1137/040620369",

language = "American English",

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T1 - Disc Separation of the Schur Complement of Diagonally Dominant Matrices and Determinantal Bounds

AU - Liu, Jianzhou

AU - Zhang, Fuzhen

PY - 2005/12/1

Y1 - 2005/12/1

N2 - We consider the Gersgorin disc separation from the origin for (doubly) diagonally dominant matrices and their Schur complements, showing that the separation of the Schur complement of a (doubly) diagonally dominant matrix is greater than that of the original grand matrix. As application we discuss the localization of eigenvalues and present some upper and lower bounds for the determinant of diagonally dominant matrices.

AB - We consider the Gersgorin disc separation from the origin for (doubly) diagonally dominant matrices and their Schur complements, showing that the separation of the Schur complement of a (doubly) diagonally dominant matrix is greater than that of the original grand matrix. As application we discuss the localization of eigenvalues and present some upper and lower bounds for the determinant of diagonally dominant matrices.

KW - Brauer theorem

KW - Comparison matrix

KW - Diagonally dominant matrix

KW - Doubly diagonally dominant matrix

KW - Gersgorin theorem

KW - H-matrix

KW - M-matrix

KW - Schur complement

KW - Separation

UR - https://nsuworks.nova.edu/math_facarticles/51

U2 - 10.1137/040620369

DO - 10.1137/040620369

M3 - Article

SN - 0895-4798

VL - 27

JO - SIAM Journal on Matrix Analysis and Applications

JF - SIAM Journal on Matrix Analysis and Applications

ER -

Disc Separation of the Schur Complement of Diagonally Dominant Matrices and Determinantal Bounds

Abstract

Keywords

Disciplines

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