@article {
author = {Hashemi, E. and Khalilnezhad, Kh. and Ghadiri, M.},
title = {BAER AND QUASI-BAER PROPERTIES OF SKEW PBW EXTENSIONS},
journal = {Journal of Algebraic Systems},
volume = {7},
number = {1},
pages = {1-24},
year = {2019},
publisher = {Shahrood University of Technology},
issn = {2345-5128},
eissn = {2345-511X},
doi = {10.22044/jas.2018.6762.1333},
abstract = {A ring $R$ with an automorphism $\sigma$ and a $\sigma$-derivation $\delta$ is called $\delta$-quasi-Baer (resp., $\sigma$-invariant quasi-Baer) if the right annihilator of every $\delta$-ideal (resp., $\sigma$-invariant ideal) of $R$ is generated by an idempotent, as a right ideal. In this paper, we study Baer and quasi-Baer properties of skew PBW extensions. More exactly, let $A=\sigma(R)\left\langle x_{1},\ldots,x_{n}\right\rangle $ be a skew PBW extension of derivation type of a ring $R$. (i) It is shown that $ R$ is $\Delta$-quasi-Baer if and only if $ A$ is quasi-Baer.(ii) $ R$ is $\Delta$-Baer if and only if $ A$ is Baer, when $R$ has IFP. Also, let $A=\sigma (R)\left\langle x_1, \ldots , x_n\right\rangle$ be a quasi-commutative skew PBW extension of a ring $R$. (iii) If $R$ is a $\Sigma$-quasi-Baer ring, then $A $ is a quasi-Baer ring. (iv) If $A $ is a quasi-Baer ring, then $R$ is a $\Sigma$-invariant quasi-Baer ring. (v) If $R$ is a $\Sigma$-Baer ring, then $A $ is a Baer ring, when $R$ has IFP. (vi) If $A $ is a Baer ring, then $R$ is a $\Sigma$-invariant Baer ring. Finally, we show that if $A = \sigma (R)\left\langle x_1, \ldots , x_n\right\rangle $ is a bijective skew PBW extension of a quasi-Baer ring $R$, then $A$ is a quasi-Baer ring.},
keywords = {Delta-quasi-Baer rings,Sigma-quasi-Baer rings,Skew PBW extensions},
url = {http://jas.shahroodut.ac.ir/article_1436.html},
eprint = {http://jas.shahroodut.ac.ir/article_1436_dcec6514a4a543ebb30256aaf152b2ad.pdf}
}
@article {
author = {Hajizamani, A.},
title = {COTORSION DIMENSIONS OVER GROUP RINGS},
journal = {Journal of Algebraic Systems},
volume = {7},
number = {1},
pages = {25-32},
year = {2019},
publisher = {Shahrood University of Technology},
issn = {2345-5128},
eissn = {2345-511X},
doi = {10.22044/jas.2018.7166.1350},
abstract = {Let $\Gamma$ be a group, $\Gamma'$ a subgroup of $\Gamma$ with finite index and $M$ be a $\Gamma$-module. We show that $M$ is cotorsion if and only if it is cotorsion as a $\Gamma'$-module. Using this result, we prove that the global cotorsion dimensions of rings $Z\Gamma$ and $Z\Gamma'$ are equal.},
keywords = {cotorsion dimension,global cotorsion dimension,perfect ring},
url = {http://jas.shahroodut.ac.ir/article_1437.html},
eprint = {http://jas.shahroodut.ac.ir/article_1437_315d3ce1c425b6bc3ed88b4eefa39ca6.pdf}
}
@article {
author = {Madani, M. A. and Mirvakili, S. and Davvaz, B.},
title = {HYPERIDEALS IN M-POLYSYMMETRICAL HYPERRINGS},
journal = {Journal of Algebraic Systems},
volume = {7},
number = {1},
pages = {33-50},
year = {2019},
publisher = {Shahrood University of Technology},
issn = {2345-5128},
eissn = {2345-511X},
doi = {10.22044/jas.2018.6969.1342},
abstract = {An M-polysymmetrical hyperring $(R,+,\cdot )$ is an algebraic system, where $(R,+)$ is an M-polysymmetrical hypergroup, $(R,\cdot )$ is a semigroup and $\cdot$ is bilaterally distributive over $+$. In this paper, we introduce the concept of hyperideals of an M-polysymmetrical hyperring and by using this concept, we construct an ordinary quotient ring. Finally, the fundamental theorem of homomorphism is derived in the context of M-polysymmetrical hyperrings.},
keywords = {M-polysymmetrical hyperring,Hyperideal,Reduced ring},
url = {http://jas.shahroodut.ac.ir/article_1438.html},
eprint = {http://jas.shahroodut.ac.ir/article_1438_b37c329d5e881f5d1d0ab6d53b4ebe5f.pdf}
}
@article {
author = {Rezagholibeigi, M. and Naghipour, A. R.},
title = {ON THE REFINEMENT OF THE UNIT AND UNITARY CAYLEY GRAPHS OF RINGS},
journal = {Journal of Algebraic Systems},
volume = {7},
number = {1},
pages = {51-68},
year = {2019},
publisher = {Shahrood University of Technology},
issn = {2345-5128},
eissn = {2345-511X},
doi = {10.22044/jas.2018.6939.1340},
abstract = {Let $R$ be a ring (not necessarily commutative) with nonzero identity. We define $\Gamma(R)$ to be the graph with vertex set $R$ in which two distinct vertices $x$ and $y$ are adjacent if and only if there exist unit elements $u,v$ of $R$ such that $x+uyv$ is a unit of $R$. In this paper, basic properties of $\Gamma(R)$ are studied. We investigate connectivity and the girth of $\Gamma(R)$, where $R$ is a left Artinian ring. We also determine when the graph $\Gamma(R)$ is a cycle graph. We prove that if $\Gamma(R)\cong\Gamma(M_{n}(F))$ then $R\cong M_{n}(F)$, where $R$ is a ring and $F$ is a finite field. We show that if $R$ is a finite commutative semisimple ring and $S$ is a commutative ring such that $\Gamma(R)\cong\Gamma(S)$, then $R\cong S$. Finally, we obtain the spectrum of $\Gamma(R)$, where $R$ is a finite commutative ring.},
keywords = {Rings,Matrix rings,Jacobson radical,Unit graphs,Unitary Cayley graphs},
url = {http://jas.shahroodut.ac.ir/article_1439.html},
eprint = {http://jas.shahroodut.ac.ir/article_1439_ebb88b5d1aeb02a640e428d56a015c93.pdf}
}
@article {
author = {Khan, R. and Khan, A. and Ahmad, B. and Gul, R.},
title = {GENERALIZED UNI-SOFT INTERIOR IDEALS IN ORDERED SEMIGROUPS},
journal = {Journal of Algebraic Systems},
volume = {7},
number = {1},
pages = {69-82},
year = {2019},
publisher = {Shahrood University of Technology},
issn = {2345-5128},
eissn = {2345-511X},
doi = {10.22044/jas.2018.6240.1310},
abstract = {For all M,N∈P(U) such that M⊂N, we first introduced the definitions of (M,N)-uni-soft ideals and (M,N)-uni-soft interior ideals of an ordered semigroup and studied them. When M=∅ and N=U, we meet the ordinary soft ones. Then we proved that in regular and in intra-regular ordered semigroups the concept of (M,N)-uni-soft ideals and the (M,N)-uni-soft interior ideals coincide. Finally, we introduced (M,N)-uni-soft simple ordered semigroup and characterized the simple ordered semigroups in terms of (M,N)-uni-soft interior ideals.},
keywords = {Soft sets,N)-uni-soft ideal,(M,N)-uni-soft interior ideals},
url = {http://jas.shahroodut.ac.ir/article_1440.html},
eprint = {http://jas.shahroodut.ac.ir/article_1440_9fb818b35cb4a812855afbc3bd816fd1.pdf}
}
@article {
author = {Nazari, Z. and Delbaznasab, A. and Kamandar, M.},
title = {NEW METHODS FOR CONSTRUCTING GENERALIZED GROUPS, TOPOLOGICAL GENERALIZED GROUPS, AND TOP SPACES},
journal = {Journal of Algebraic Systems},
volume = {7},
number = {1},
pages = {83-94},
year = {2019},
publisher = {Shahrood University of Technology},
issn = {2345-5128},
eissn = {2345-511X},
doi = {10.22044/jas.2018.7007.1345},
abstract = {The purpose of this paper is to introduce new methods for constructing generalized groups, generalized topological groups and top spaces. We study some properties of these structures and present some relative concrete examples. Moreover, we obtain generalized groups by using of Hilbert spaces and tangent spaces of Lie groups, separately.},
keywords = {Generalized group,Generalized ring,Topological generalized group,Top space,Lie group},
url = {http://jas.shahroodut.ac.ir/article_1441.html},
eprint = {http://jas.shahroodut.ac.ir/article_1441_9692022631d2c6707ac622d360bde6c6.pdf}
}
@article {
author = {Bayat, R. and Alaeiyan, M. and Firouzian, S.},
title = {ON THE NORMALITY OF t-CAYLEY HYPERGRAPHS OF ABELIAN GROUPS},
journal = {Journal of Algebraic Systems},
volume = {7},
number = {1},
pages = {95-103},
year = {2019},
publisher = {Shahrood University of Technology},
issn = {2345-5128},
eissn = {2345-511X},
doi = {10.22044/jas.2018.6789.1334},
abstract = {A t-Cayley hypergraph X = t-Cay(G; S) is called normal for a finite group G, if the right regular representationR(G) of G is normal in the full automorphism group Aut(X) of X. In this paper, we investigate the normality of t-Cayley hypergraphs of abelian groups, where S < 4.},
keywords = {hypergraph,t-Cayley hypergraph,normal t-Cayley hypergraph},
url = {http://jas.shahroodut.ac.ir/article_1442.html},
eprint = {http://jas.shahroodut.ac.ir/article_1442_267af50d206373aeaaa0fe17235b3920.pdf}
}