2013
DOI: 10.1080/03081087.2013.779272
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The diamond partial order in rings

Abstract: In this paper we introduce a new partial order on a ring, namely the diamond partial order. This order is an extension of a partial order defined in a matrix setting in [J.K. Baksalary and J. Hauke, A further algebraic version of Cochran's theorem and matrix partial orderings, Linear Algebra and its Applications, 127, 157-169, 1990]. We characterize the diamond partial order on rings and study its relationships with other partial orders known in the literature. We also analyze successors, predecessors and maxi… Show more

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Cited by 36 publications
(16 citation statements)
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“…Example 3.9 It is not hard to see that I n 2,3 ≤ J n (1) but rk I n = rk J n (1) = n. Remark 3. 10 The above examples show that in contrast to all known extensions of the sharp order, see [4], the 2,3 ≤ -order is unrelated with the minus order and has nonstandard behaviour with respect to the rank function.…”
Section: Examples and Counterexamplesmentioning
confidence: 81%
“…Example 3.9 It is not hard to see that I n 2,3 ≤ J n (1) but rk I n = rk J n (1) = n. Remark 3. 10 The above examples show that in contrast to all known extensions of the sharp order, see [4], the 2,3 ≤ -order is unrelated with the minus order and has nonstandard behaviour with respect to the rank function.…”
Section: Examples and Counterexamplesmentioning
confidence: 81%
“…In the rest of the section, we will generalize some of these results (see also [24]). The first lemma will be needed in the continuation.…”
Section: Theorem 10 Let a Be A Rickart Ring And Let G(a) Be The Subsementioning
confidence: 85%
“…But, in recent years, a number of papers was published considering the generalized inverses and associated partial orders in rings, see for example [14]. Furthermore, some new generalized inverses, such as core and dual core inverse (see [1]), (b, c)-inverse (see [4]) and an inverse along an element (see [19]), are introduced.…”
Section: Introductionmentioning
confidence: 98%