Hua's Matrix Equality and Schur Complements

Chris Paige; George P. H. Styan; Bo-Ying Wang; Fuzhen Zhang

Hua's Matrix Equality and Schur Complements

Chris Paige
, George P. H. Styan
, Bo-Ying Wang
, Fuzhen Zhang

Department of Mathematics

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

Abstract

The purpose of this paper is to revisit Hua's matrix equality (and inequality) through the Schur complement. We present Hua's original proof and two new proofs with some extensions of Hua's matrix equality and inequalities. The new proofs use a result concerning Shur complements and a generalization of Sylvester's law of inertia, each of which is useful in its own right.

Original language	American English
Journal	International Journal of Information & Systems Sciences
Volume	4
State	Published - Mar 1 2008

Keywords

Contractions
Contractive matrices
Generalized inverses
Hua matrix
Hua-Marcus inequalities
Hua’s determinantal inequality
Hua’s matrix equality
Hua’s matrix inequality
Inertia additivity
Matrix inequalities
Rank additivity
Schur complement
Sylvester’s law of inertia

Disciplines

Mathematics

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Cite this

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title = "Hua's Matrix Equality and Schur Complements",

abstract = " The purpose of this paper is to revisit Hua's matrix equality (and inequality) through the Schur complement. We present Hua's original proof and two new proofs with some extensions of Hua's matrix equality and inequalities. The new proofs use a result concerning Shur complements and a generalization of Sylvester's law of inertia, each of which is useful in its own right.",

keywords = "Contractions, Contractive matrices, Generalized inverses, Hua matrix, Hua-Marcus inequalities, Hua{\textquoteright}s determinantal inequality, Hua{\textquoteright}s matrix equality, Hua{\textquoteright}s matrix inequality, Inertia additivity, Matrix inequalities, Rank additivity, Schur complement, Sylvester{\textquoteright}s law of inertia",

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AU - Styan, George P. H.

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N2 - The purpose of this paper is to revisit Hua's matrix equality (and inequality) through the Schur complement. We present Hua's original proof and two new proofs with some extensions of Hua's matrix equality and inequalities. The new proofs use a result concerning Shur complements and a generalization of Sylvester's law of inertia, each of which is useful in its own right.

AB - The purpose of this paper is to revisit Hua's matrix equality (and inequality) through the Schur complement. We present Hua's original proof and two new proofs with some extensions of Hua's matrix equality and inequalities. The new proofs use a result concerning Shur complements and a generalization of Sylvester's law of inertia, each of which is useful in its own right.

KW - Contractions

KW - Contractive matrices

KW - Generalized inverses

KW - Hua matrix

KW - Hua-Marcus inequalities

KW - Hua’s determinantal inequality

KW - Hua’s matrix equality

KW - Hua’s matrix inequality

KW - Inertia additivity

KW - Matrix inequalities

KW - Rank additivity

KW - Schur complement

KW - Sylvester’s law of inertia

UR - https://nsuworks.nova.edu/math_facarticles/62

M3 - Article

SN - 1708-296X

VL - 4

JO - International Journal of Information & Systems Sciences

JF - International Journal of Information & Systems Sciences

ER -

Hua's Matrix Equality and Schur Complements

Abstract

Keywords

Disciplines

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