Temat: nilpotents - Katalog OPAC zbiorów

Skocz do pozycji: 1.

Tytuł:: Invo-regular unital rings
Autorzy:: Danchev, Peter V.
Powiązania:: https://bibliotekanauki.pl/articles/747073.pdf
Data publikacji:: 2018
Wydawca:: Uniwersytet Marii Curie-Skłodowskiej. Wydawnictwo Uniwersytetu Marii Curie-Skłodowskiej
Tematy:: Unit-regular rings
clean rings
strongly clean rings
idempotents
involutions
nilpotents
units
Opis:: It was asked by Nicholson (Comm. Algebra, 1999) whether or not unit-regular rings are themselves strongly clean. Although they are clean as proved by Camillo-Khurana (Comm. Algebra, 2001), recently Nielsen and Ster showed in Trans. Amer. Math. Soc., 2018 that there exists a unit-regular ring which is not strongly clean. However, we define here a proper subclass of rings of the class of unit-regular rings, called invo-regular rings, and establish that they are strongly clean. Interestingly, without any concrete indications a priori, these rings are manifestly even commutative invo-clean as defined by the author in Commun. Korean Math. Soc., 2017.
Źródło:: Annales Universitatis Mariae Curie-Skłodowska, sectio A – Mathematica; 2018, 72, 1
0365-1029
2083-7402
Pojawia się w:: Annales Universitatis Mariae Curie-Skłodowska, sectio A – Mathematica
Dostawca treści:: Biblioteka Nauki

Artykuł

Skocz do pozycji: 2.

Tytuł:: A characterization of weakly J(n)-rings
Autorzy:: Danchev, P. V.
Powiązania:: https://bibliotekanauki.pl/articles/2052406.pdf
Data publikacji:: 2018
Wydawca:: Politechnika Rzeszowska im. Ignacego Łukasiewicza. Oficyna Wydawnicza
Tematy:: Boolean rings
idempotents
units
nilpotents
Jacobson radical
J (n)-rings
pierścień Boole'a
idempotent pierścienia
element idempotentny
jednostki
nilpotent pierścienia
element nilpotentny
rodnik Jacobsona
Opis:: A ring $R$ is called a J(n)-ring if there exists a natural number $n \geq 1$ such that for each element $r \in R$ the equality $r^{n+1} = r$ holds and a weakly J(n)-ring if there exists a natural number $n \geq 1$ such that for each element $r \in R$ the equalities $r^{n+1} = r$ or $r^{n+1} = -r$ hold. We completely describe both classes of these rings R for any n, thus considerably extending some well-known results in the subject, especially that of V. Perić in Publ. Inst. Math. Beograd (1983) as well as, in particular, the classical description of Boolean rings when n = 1.
Źródło:: Journal of Mathematics and Applications; 2018, 41; 53-61
1733-6775
2300-9926
Pojawia się w:: Journal of Mathematics and Applications
Dostawca treści:: Biblioteka Nauki

Artykuł

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