Volume 10 (2022-2023)
Volume 9 (2021-2022)
Volume 8 (2020-2021)
Volume 7 (2019-2020)
Volume 6 (2018-2019)
Volume 5 (2017-2018)
Volume 4 (2016-2017)
Volume 3 (2015-2016)
Volume 2 (2014-2015)
Volume 1 (2013-2014)
A NEW CHARACTERIZATION OF SIMPLE GROUP G 2 (q) WHERE q ⩽ 11

M. Bibak; Gh.R. Rezaeezadeh; E. Esmaeilzadeh

Volume 8, Issue 1 , September 2020, , Pages 103-111

https://doi.org/10.22044/jas.2019.7696.1377

Abstract
  In this paper, we prove that every finite group $ G $ with the same order and largest element order as $G_{2}(q)$, where $ q\leq 11 $ is necessarily isomorphic to the group $G_{2}(q)$.  Read More

ON p-NILPOTENCY OF FINITE GROUPS WITH SS-NORMAL SUBGROUPS

G. R. REZAEEZADEH; Z. AGHAJARI

Volume 5, Issue 2 , January 2018, , Pages 139-148

https://doi.org/10.22044/jas.2017.5274.1270

Abstract
  Abstract. A subgroup H of a group G is said to be SS-embeddedin G if there exists a normal subgroup T of G such that HT issubnormal in G and H \ T ≤ H sG , where H sG is the maximal s-permutable subgroup of G contained in H. We say that a subgroupH is an SS-normal subgroup in G if there exists ...  Read More

ON FINITE GROUPS IN WHICH SS-SEMIPERMUTABILITY IS A TRANSITIVE RELATION

S.E. Mirdamadi; Gh.R Rezaeezadeh

Volume 4, Issue 1 , September 2016, , Pages 29-36

https://doi.org/10.22044/jas.2016.726

Abstract
  Let H be a subgroup of a finite group G. We say that H is SS-semipermutable in Gif H has a supplement K in G such that H permutes with every Sylow subgroup X of Kwith (jXj; jHj) = 1. In this paper, the Structure of SS-semipermutable subgroups, and finitegroups in which SS-semipermutability is a transitive ...  Read More