Reverse order laws for generalized inverses of multiple matrix products
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Publication:1963945
DOI10.1016/S0024-3795(99)00053-1zbMath0943.15001MaRDI QIDQ1963945
Publication date: 30 August 2000
Published in: Linear Algebra and its Applications (Search for Journal in Brave)
generalized inverseMoore-Penrose inverseg-inversemultiple matrix productsproduct-singular value decomposition
Related Items (22)
The reverse order law for the generalized inverse \(A^{(2)}_{T,S}\) ⋮ Reverse order laws for least squares \(g\)-inverses and minimum norm \(g\)-inverses of products of two matrices ⋮ Forward order law for \(g\)-inverses of the product of two matrices ⋮ Reverse order law for least squares g-inverses of multiple matrix products ⋮ Mixed-type reverse-order laws for \(\{1, 3, 4\}\)-generalized inverses over Hilbert spaces ⋮ Applications of completions of operator matrices to reverse order law for \(\{1\}\)-inverses of operators on Hilbert spaces ⋮ The reverse order law for \(\{1, 3, 4\}\)-inverse of the product of two matrices ⋮ Reverse order law for generalized inverses of multiple operator product ⋮ A note on the reverse order law for least squareg-inverse of operator product ⋮ Reverse order laws for reflexive generalized inverse of operators ⋮ Mixed-type reverse-order laws for the generalized inverses of an operator product ⋮ The reverse order laws for {1, 2, 3}- and {1, 2, 4}-inverses of multiple matrix products ⋮ The forward order laws for \(\{1,2,3\}\)- and \(\{1,2,4\}\)-inverses of multiple matrix products ⋮ Moore-Penrose inverse in rings with involution ⋮ The reverse order laws for \(\{1,2,3\}\) - and \(\{1,2,4\}\) -inverses of a two-matrix product ⋮ Mixed-type reverse order law of \((AB)^{(13)}\) ⋮ The mixed-type reverse order laws for weighted generalized inverses of a triple matrix product ⋮ A note on the forward order law for least square \(g\)-inverse of three matrix products ⋮ Unnamed Item ⋮ The forward order laws for {1,2,3}- and {1,2,4}-inverses of a three matrix products ⋮ Reverse order laws for Hirano inverses in rings ⋮ On the mixed-type generalized inverses of the products of two operators
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