Title of article :
The Validity of a Thompson’s Problem for PSL(4, 7)
Author/Authors :
Khosravi, Behrooz Department of Mathematics and Computer Science - Amirkabir University of Technology (Tehran Polytechnic) , Kalantarpour, Cyrus Department of Mathematics and Computer Science - Amirkabir University of Technology, Tehran, Iran
Abstract :
Let $pi_e(G)$ be the set of elements orders of $ G$. Also let $ s_n$ be the number of elements of order $n$ in $G $ and ${rm nse}(G)= lbrace s_nmid nin pi_e(G) rbrace $.
In this paper we prove that if $ G$ is a group such that ${rm nse}(G)= {rm nse}(rm PSL(4,7)) $, $19bigvert|G|$ and $19^2nmid|G|$, then $ Gcong rm PSL(4,7)$. As a consequence of this result it follows that Thompson's problem is satisfied for the simple group $rm PSL(4,7)$.
Keywords :
Thompson’s problem , Characterization , Number of elements of the same order , Projective special linear group , Hall subgroup , NSE , Sporadic groups , Python
Journal title :
AUT Journal of Mathematics and Computing
