The Moore-Penrose inverse of a morphism with factorization

Diagonalisation of idempotent matrices, The Moore idempotents of a matrix, Elements of rings with equal spectral idempotents, Drazin-Moore-Penrose invertibility in rings, Generalized inverses of morphisms with kernels, Categories of matrices with only obvious Moore-Penrose inverses, About the group inverse and Moore-Penrose inverse of a product, Group and Moore-Penrose inverses of regular morphisms with kernel and cokernel, The moore-penrose inverse of a matrix over a semi-simpie artinian ring, The Moore-Penrose inverse of a factorization, Moore-Penrose Dagger Categories, On matrices over an arbitrary semiring and their generalized inverses, Generalized invertibility in two semigroups of a ring., Symmetric morphisms and the existence of Moore-Penrose inverses, The core and dual core inverse of a morphism with factorization, The moore-penrose inverse of a matrix over a semi-simple artinian ring with respect to an involution, Diagonalization of matrices over graded principal ideal domains, Moore–Penrose invertibility in involutory rings: the case aa ^†=bb ^†, The Moore-Penrose inverse of a morphism in an additive category, The Moore-Penrose inverse over a commutative ring, The Moore-Penrose inverse of von Neumann regular matrices over a ring, Strongly Involutory Functors, Generalized inverses of matrices: a perspective of the work of Penrose, The core and dual core inverse of a morphism with kernel, Involutory functions and Moore-Penrose inverses of matrices in an arbitrary field, Generalized inverses modulo ℋ in semigroups and rings, Moore-Penrose inverses for matrices over some Noetherian rings, EP morphisms, Core and dual core inverses of a sum of morphisms, The Moore-Penrose inverse in rings with involution, Pseudo core inverses of a sum of morphisms, Generalized invertibility of Hankel and Toeplitz matrices, Additive properties for the pseudo core inverse of morphisms in an additive category, Group and Moore-Penrose invertibility of Bézoutians

• Generalized inverses of matrices with entries taken from an arbitrary field
• Generalized inverses of morphisms
• A unified approach to generalized inverses of linear operators: I. Algebraic, topological and projectional properties
• Computation of Generalized Inverse Matrices which Satisfy Specified Conditions
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