TAILIEUCHUNG - Some characterizations of right c-regularity and (b, c)-inverse
Let R be a ring and a, b, c ∈ R. We give a novel characterization of group inverses (resp. EP elements) by the properties of right (resp. left ) c -regular inverses of a and discuss the relation among the strongly left (b, c)-invertibility of a, the right ca-regularity of b , and the (b, c)-invertibility of a. | Turk J Math (2018) 42: 3078 – 3089 © TÜBİTAK doi: Turkish Journal of Mathematics Research Article Some characterizations of right c-regularity and (b, c)-inverse Ruju ZHAO∗,, Hua YAO,, Long WANG, Junchao WEI, School of Mathematical Sciences, Yangzhou University, Yangzhou, Jiangsu, . China Received: • Accepted/Published Online: • Final Version: Abstract: Let R be a ring and a, b, c ∈ R . We give a novel characterization of group inverses (resp. EP elements) by the properties of right (resp. left ) c -regular inverses of a and discuss the relation among the strongly left (b, c) -invertibility of a , the right ca -regularity of b , and the (b, c) -invertibility of a . Finally, we investigate the sufficient and necessary condition for a ring to be a strongly left min-Abel ring by means of the (b, c) -inverse of a . Key words: Right c -regular element, (b, c) -inverse, group inverse, EP element, left min-Abel ring 1. Introduction Let S be a semigroup and a, b, c ∈ S . Then a is said to be (b, c) -invertible [4] if there exists y ∈ bSy ∩ ySc such that yab = b and cay = c. Such an y is called a (b, c) -inverse of a, which is always unique if it exists, denoted by a
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