TY - JOUR
ID - 172327
TI - On some groups without perfect factors
JO - Journal of the Iranian Mathematical Society
JA - JIMS
LA - en
SN -
AU - Kurdachenko, L. A.
AU - Longobardi, P.
AU - Maj, M.
AD - Department of Algebra and Geometry , School of Mathematics and Mechanics,
Dnipro
AD - Department of Mathematics ,University of Salerno, Fisciano (SA) Italy
AD - Department of Mathematics, University of Salerno, Fisciano (SA), Italy
Y1 - 2023
PY - 2023
VL - 4
IS - 2
SP - 79
EP - 94
KW - G-perfect factors
KW - Nilpotent groups
KW - hypercentral groups
KW - upper central series
DO - 10.30504/jims.2023.400933.1123
N2 - If $G$ is a group and $H, K$ are normal subgroups of $G$, $H\leq K$, then $K/H$ is said to be a $G$-perfect factor if $[K/H, G] = K/H$. If $G$ is a nilpotent group, then every non-trivial factor of $G$ is not $G$-perfect. Conversely, if $G$ is finite and all non-trivial factors of $G$ are not $G$-perfect, then $G$ is nilpotent. We study (infinite) groups with no non-trivial $G$-perfect factors. We prove that if either $G$ is a locally generalized radical group with finite section rank, or $G$ has a normal nilpotent subgroup $A$ such that $G/A$ is a locally finite group with Chernikov Sylow $p$-subgroups for every prime $p$, and $G$ has no non-trivial $G$-perfect factors, then for every prime $p$ there exists a positive integer $s_p$ such that $\zeta_{s_p}(G)$, the $s_p$-term of the upper central series of $G$, contains the Sylow $p$-subgroups of $G$, and $G/Tor(G)$ is nilpotent. In particular, $G$ is hypercentral and the hypercentral length of $G$ is at most $\omega+k$, for some positive integer $k$.
UR - https://jims.ims.ir/article_172327.html
L1 - https://jims.ims.ir/article_172327_c0c8b0126863864f86023909d470ed3c.pdf
ER -