V. A. Vedernikov, M. M. Sorokina, “$\mathfrak F$-projectors and $\mathfrak F$-covering subgroups of finite groups”, Sibirsk. Mat. Zh., 2016, Volume 57, Number 6,Pages 1224

This article is cited in 5 papers

$\mathfrak F$-projectors and $\mathfrak F$-covering subgroups of finite groups

V. A. Vedernikov^a, M. M. Sorokina^b

^a Moscow City Teachers' Training University, Moscow, Russia
^b Bryansk State University, Bryansk, Russia

Abstract: Given a nonempty set $\omega$ of primes and a nonempty class $\mathfrak F$ of groups, we define the $\mathfrak F^\omega$-projector and $\mathfrak F^\omega$-covering subgroup of a finite group and study their properties (existence, invariance under certain homomorphisms, conjugacy, and embedding). We extend the results of Gaschütz, Schunck, Erickson, and others.

Keywords: finite group, $\omega$-local formation, $\mathfrak F^\omega$-projector, $\mathfrak F^\omega$-covering subgroup.

UDC: 512.542

Received: 17.12.2015

DOI: 10.17377/smzh.2016.57.603