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Exponentiated Generalized Inverse Weibull Distribution
, 2014The inverse Weibull distribution can be readily applied to a wide range of situations including applications in medicine, reliability and ecology. In this article we introduce a new model of generalized inverse Weibull distribution referred to as the ...
I. Elbatal, H. Muhammed
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On the generation of matrix generalized inverse
Computers & Electrical Engineering, 1977Abstract A simple, readily applicable algorithm for the calculation of matrix generalized inverse is proposed. Also, listings of related subroutines are given.
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, 2014
Euler's equation provides us with a system of linear equations for localizing a magnetic dipole from measurements of the magnetic field and its gradients.
T. Nara, W. Ito
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Euler's equation provides us with a system of linear equations for localizing a magnetic dipole from measurements of the magnetic field and its gradients.
T. Nara, W. Ito
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On generalized inverse transversals
Acta Mathematica Sinica, English Series, 2008Let S be a regular semigroup, So an inverse subsemigroup of S. So is called a generalized inverse transversal of S, if V (x) ∩ So ≠ o. In this paper, some properties of this kind of semigroups are discussed. In particular, a construction theorem is obtained which contains some recent results in the literature as its special cases.
Rong Hua Zhang, Shou Feng Wang
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Monotonicity and the Generalized Inverse
SIAM Journal on Applied Mathematics, 1972Necessary and sufficient conditions are given in order that a matrix A have a nonnegative generalized inverse $A^ + $. The concept of row-monotonicity is introduced and a characterization of row-monotone matrices is used to derive a necessary and sufficient condition on $A\geqq 0$ so that $A^ + \geqq 0$.
Abraham Berman, Robert J. Plemmons
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Generalized Inverses in a Nutshell
2011Let A be a given n × m matrix and y a given n × 1 vector. Consider the linear equation $${\bf Ab} = \bf y $$ (1.4) .
Jarkko Isotalo +2 more
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Archive for Rational Mechanics and Analysis, 1976
The existence of the Moore-Penrose inverse is discussed for elements of a *-regular ring R. A technique is developed for computing conditional and reflexive inverses for matrices in R2×2, which is then used to calculate the Moore-Penrose inverse for these matrices.
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The existence of the Moore-Penrose inverse is discussed for elements of a *-regular ring R. A technique is developed for computing conditional and reflexive inverses for matrices in R2×2, which is then used to calculate the Moore-Penrose inverse for these matrices.
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On generalized inverses of matrices
Mathematical Proceedings of the Cambridge Philosophical Society, 1966The notion of the inverse of a matrix with entries from the real or complex fields was generalized by Moore (6, 7) in 1920 to include all rectangular (finite dimensional) matrices. In 1951, Bjerhammar (2, 3) rediscovered the generalized inverse for rectangular matrices of maximal rank.
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Deep learning in nano-photonics: inverse design and beyond
Photonics Research, 2021Peter R Wiecha +2 more
exaly