Title of article
A matrix version of the Wielandt inequality and its applications to statistics Original Research Article
Author/Authors
Song-Gui Wang، نويسنده , , Wai-Cheung Ip، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 1999
Pages
11
From page
171
To page
181
Abstract
Suppose that A is an n×n positive definite Hermitian matrix. Let X and Y be n×p and n×q matrices, respectively, such that X*Y=0. The present article proves the following inequality,imagewhere λ1 and λn are respectively the largest and smallest eigenvalues of A, and M− stands for a generalized inverse of M. This inequality is an extension of the well-known Wielandt inequality in which both X and Y are vectors. The inequality is utilized to obtain some interesting inequalities about covariance matrix and various correlation coefficients including the canonical correlation, multiple and simple correlations. Some applications in parameter estimation are also given.
Keywords
Wielandt inequality , Canonicalcorrelation , Cauchy±Schwarz inequality , Condition number , Generalized inverse , Kantorovich inequality
Journal title
Linear Algebra and its Applications
Serial Year
1999
Journal title
Linear Algebra and its Applications
Record number
822792
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