New characterization of some linear groups
محل انتشار: مجله بین المللی ریاضیات صنعتی، دوره: 8، شماره: 2
سال انتشار: 1395
نوع سند: مقاله ژورنالی
زبان: انگلیسی
مشاهده: 43
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شناسه ملی سند علمی:
JR_IJIM-8-2_007
تاریخ نمایه سازی: 27 دی 1402
چکیده مقاله:
There are a few finite groups that are determined up to isomorphism solely by their order, such as \mathbb{Z}_{۲} or \mathbb{Z}_{۱۵}. Still other finite groups are determined by their order together with other data, such as the number of elements of each order, the structure of the prime graph, the number of order components, the number of Sylow p-subgroups for each prime p, etc. In this paper, we investigate the possibility of characterizing the projective special linear groups L_{n}(۲) by simple conditions when ۲^{n}-۱ is a prime number. Our result states that: G\cong L_{n}(۲) if and only if |G|=|L_{n}(۲)| and G has one conjugacy class length \frac{|L_{n}(۲)|% }{۲^{n}-۱}, where ۲^{n}-۱=p is a prime number. Furthermore, we will show that Thompson's conjecture holds for the simple groups L_{n}(۲), where ۲^{n}-۱ prime is a prime number. By Thompson's conjecture if L is a finite non-Abelian simple group, G is a finite group with a trivial center, and the set of the conjugacy classes size of L is equal to G, then L\cong G.
کلیدواژه ها:
نویسندگان
A. Khalili Asboei
Young Researchers Club and Elite, Buinzahra Branch, Islamic Azad University, Buinzahra, Iran.
R. Mohammadyari
Young Researchers Club and Elite, Buinzahra Branch, Islamic Azad University, Buinzahra, Iran.
M. Rahimi-Esbo
Young Researchers Club and Elite, Buinzahra Branch, Islamic Azad University, Buinzahra, Iran.