More results on Schur complements in Euclidean Jordan algebras

More results on Schur complements in Euclidean Jordan algebras

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Article ID: iaor20123832
Volume: 53
Issue: 1
Start Page Number: 121
End Page Number: 134
Publication Date: May 2012
Journal: Journal of Global Optimization
Authors: , ,
Keywords: linear algebra
Abstract:

In a recent article Gowda and Sznajder (Linear Algebra Appl 432:1553–1559, 2010) studied the concept of Schur complement in Euclidean Jordan algebras and described Schur determinantal and Haynsworth inertia formulas. In this article, we establish some more results on the Schur complement. Specifically, we prove, in the setting of Euclidean Jordan algebras, an analogue of the Crabtree‐Haynsworth quotient formula and show that any Schur complement of a strictly diagonally dominant element is strictly diagonally dominant. We also introduce the concept of Schur product of a real symmetric matrix and an element of a Euclidean Jordan algebra when its Peirce decomposition with respect to a Jordan frame is given. An Oppenheim type inequality is proved in this setting.

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