AbstractThe defining equations for the Moore-Penrose inverse of a matrix are extended to give a unique type of generalized inverse for matrices over arbitrary fields
Moore (1920) defined the reciprocal of any matrix over the complex field by three con-ditions, but t...
AbstractSome new results on “reverse order law” related to the generalized inverse of the product of...
AbstractNonnegative matrices which are equal to their Moore-Penrose generalized inverse are characte...
AbstractLet A be a matrix over a ring. Suppose that P, Q, P′, and Q′ are matrices over the ring such...
AbstractThe defining equations for the Moore-Penrose inverse of a matrix are extended to give a uniq...
AbstractThe Moore-Penrose inverse of a 2 × 2 block matrix M = m=acbd is discussed. General expressio...
AbstractAn expression for the Moore-Penrose inverse of certain singular circulants by S.R. Searle is...
AbstractLet R be a commutative ring with 1 and with an involution a → ā, and let MR be the category ...
J.R. Sendra is member of the Research Group ASYNACS (Ref.CT-CE2019/683)In this paper, given a field ...
We give necessary and sufficient conditions for the existence of the Moore-Penrose inverse of an ele...
J.R. Sendra is member of the Research Group ASYNACS (Ref.CT-CE2019/683)In this paper, given a field ...
AbstractLet R be an associative ring with 1 and with an involution a → ā, and let MR be the category...
Moore (1920) defined the reciprocal of any matrix over the complex field by three con-ditions, but t...
Moore (1920) defined the reciprocal of any matrix over the complex field by three con-ditions, but t...
Characterizations are given for elements in an arbitrary ring with involution, having a group invers...
Moore (1920) defined the reciprocal of any matrix over the complex field by three con-ditions, but t...
AbstractSome new results on “reverse order law” related to the generalized inverse of the product of...
AbstractNonnegative matrices which are equal to their Moore-Penrose generalized inverse are characte...
AbstractLet A be a matrix over a ring. Suppose that P, Q, P′, and Q′ are matrices over the ring such...
AbstractThe defining equations for the Moore-Penrose inverse of a matrix are extended to give a uniq...
AbstractThe Moore-Penrose inverse of a 2 × 2 block matrix M = m=acbd is discussed. General expressio...
AbstractAn expression for the Moore-Penrose inverse of certain singular circulants by S.R. Searle is...
AbstractLet R be a commutative ring with 1 and with an involution a → ā, and let MR be the category ...
J.R. Sendra is member of the Research Group ASYNACS (Ref.CT-CE2019/683)In this paper, given a field ...
We give necessary and sufficient conditions for the existence of the Moore-Penrose inverse of an ele...
J.R. Sendra is member of the Research Group ASYNACS (Ref.CT-CE2019/683)In this paper, given a field ...
AbstractLet R be an associative ring with 1 and with an involution a → ā, and let MR be the category...
Moore (1920) defined the reciprocal of any matrix over the complex field by three con-ditions, but t...
Moore (1920) defined the reciprocal of any matrix over the complex field by three con-ditions, but t...
Characterizations are given for elements in an arbitrary ring with involution, having a group invers...
Moore (1920) defined the reciprocal of any matrix over the complex field by three con-ditions, but t...
AbstractSome new results on “reverse order law” related to the generalized inverse of the product of...
AbstractNonnegative matrices which are equal to their Moore-Penrose generalized inverse are characte...
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