A theorem on the difference of the generalized inverses of two nonnegative matrices
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Publication:4141341
DOI10.1080/03610927708827471zbMath0365.15003OpenAlexW2018505904MaRDI QIDQ4141341
George A. Milliken, Fikri Akdeniz
Publication date: 1977
Published in: Communications in Statistics - Theory and Methods (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1080/03610927708827471
Related Items (22)
A note on the matrix ordering of special C-matrices ⋮ On ordering properties of generalized inverses of nonnegative definite matrices ⋮ The positive semidefiniteness of partitioned matrices ⋮ On Löwner-ordering antitonicity of matrix inversion ⋮ Some remarks on partial orderings of nonnegative definite matrices ⋮ Comparing generalized mixed estimators with respect to covariance matrix in a linear regression model ⋮ A further note on a theorem on the difference of the generalized inverses of two nonnegative definite matrices ⋮ Some remarks on a ridge-type-estimator and good prior means ⋮ On the \(\{2\}\)-inverse and some ordering properties of nonnegative definite matrices ⋮ Some further aspects of the löwner-ordering antitonicity of the moore-penrose inverse ⋮ A generalization and Bayesian interpretation of ridge-type estimators with good prior means ⋮ On some ordering properties of the generalized inverses of nonnegative definite matrices ⋮ One-dimensional quasistatic model of biodegradable elastic curved rods ⋮ Schur complements and statistics ⋮ On linear regression designs which maximize information ⋮ Löwner-ordering antitonicity of generalized inverses of Hermitian matrices ⋮ G-majorization with applications to matrix orderings ⋮ A simplified proof of a theorem on the difference of the moore–penrose inverses of two positive semi–difinte matrices ⋮ Some properties of matrix partial orderings ⋮ Some remarks on partial orderings of hermitian matrices ⋮ The Moore-Penrose inverse of a partitioned nonnegative definite matrix ⋮ Minimum mean square error estimation in linear regression
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