The (b; c)-inverse in semigroups and rings with involution

Xiaofeng CHEN; Jianlong CHEN

doi:10.1007/s11464-020-0880-7

Front. Math. China ›› 2020, Vol. 15 ›› Issue (6) :1089 -1104. DOI: 10.1007/s11464-020-0880-7

RESEARCH ARTICLE

The (b; c)-inverse in semigroups and rings with involution

Xiaofeng CHEN
, Jianlong CHEN ^†

Author information +

History +

PDF (280KB)

Abstract

We first prove that if a is both left (b; c)-invertible and left (c; b)- invertible, then a is both (b; c)-invertible and (c; b)-invertible in a *-monoid, which generalizes the recent result about the inverse along an element by L. Wang and D. Mosić [Linear Multilinear Algebra, Doi.org/10.1080/03081087. 2019.1679073], under the conditions (ab)* = ab and (ac)* = ac: In addition, we consider that ba is (c; b)-invertible, and at the same time ca is (b; c)-invertible under the same conditions, which extend the related results about Moore- Penrose inverses studied by J. Chen, H. Zou, H. Zhu, and P. Patrício [Mediterr J. Math., 2017, 14: 208] to (b; c)-inverses. As applications, we obtain that under condition (a²)* = a²; a is an EP element if and only if a is one-sided core invertible, if and only if a is group invertible.

Keywords

(b / c)-inverse, inverse along an element, core inverse, EP element

Cite this article

Download citation ▾

Xiaofeng CHEN, Jianlong CHEN. The (b; c)-inverse in semigroups and rings with involution. Front. Math. China, 2020, 15(6): 1089-1104 DOI:10.1007/s11464-020-0880-7

登录浏览全文

4963

注册一个新账户忘记密码

References

Publishing order | Descend order by publishing year | Descend order by cited within

[1]	Baksalary O M, Trenkler G. Core inverse of matrices. Linear Multilinear Algebra, 2010, 58(6): 681–697

[2]	Chen J, Zou H, Zhu H, Patrício P. The one-sided inverse along an element in semi- groups and rings. Mediterr J Math, 2017, 14: 208

[3]	Drazin M P.A class of outer generalized inverses. Linear Algebra Appl, 2012, 436: 1909–1923

[4]	Drazin M P. Left and right generalized inverses. Linear Algebra Appl, 2016, 510: 64–78

[5]	Hartwig R E.Block generalized inverses. Arch Ration Mech Anal, 1976, 61: 197–251

[6]	Ke Y, Wang Z, Chen J. The (b; c)-inverse for products and lower triangular matrices. J Algebra Appl, 2017, 16(12): 1750222

[7]	Koliha J J, Patrício P.Elements of rings with equal spectral idempotents. J Aust Math Soc, 2002, 72: 137–152

[8]	Li T, Chen J. Characterizations of core and dual core inverses in rings with involution. Linear Multilinear Algebra, 2018, 66(4): 717–730

[9]	Mary X. On generalized inverses and Green's relations. Linear Algebra Appl, 2011, 434: 1836–1844

[10]	Mosić D, Djordievíc D S.Further results on the reverse order law for the Moore-Penrose inverse in rings with involution. Appl Math Comput, 2011, 218: 1478–1483

[11]	Rakíc D S, Dinčíc N C, Djordievíc D S. Group, Moore-Penrose, core and dual core inverse in rings with involution. Linear Algebra Appl, 2014, 463: 115–133

[12]	Wang L, Mosić D. The one-sided inverse along two elements in rings. Linear Multi- linear Algebra, Doi.org/10.1080/03081087.2019.1679073

[13]	Xu S,Chen J, Zhang X. New characterizations for core and dual core inverses in rings with involution. Front Math China, 2017, 12(1): 231–246

[14]	Zhu H, Chen J, Patrício P.Further results on the inverse along an element in semi- groups and rings. Linear Multilinear Algebra, 2016, 64(3): 393{403

[15]	Zou H, Chen J, Li T, Gao Y.Characterizations of core and dual core inverses in rings with involution. Bull Malays Math Sci Soc, 2018, 41(4): 1835–1857