Title: On the residual of a factorized group with widely supersoluble factors
Authors: Monakhov, V.S.
Trofimuk, A.A.
Монахов, В.С.
Трофимук, А.А.
Keywords: widely supersoluble groups
mutually sn-permutable subgroups
ℙ-subnormal subgroup
the Ӿ-residual
Issue Date: 2020
Citation: Monakhov, V.S. On the residual of a factorized group with widely supersoluble factors / V.S. Monakhov, A.A. Trofimuk // arXiv.org.math.GR. - 2020. - arXiv:2002.06355v2. - P. [1-10].
Abstract: Let P be the set of all primes. A subgroup H of a group G is called P-subnormal in G, if either H = G, or there exists a chain of subgroups H = H0 ≤ H1 ≤ . . . ≤ Hn = G, |Hi : Hi−1| ∈ P, ∀i. A group G is called widely supersoluble, w-supersoluble for short, if every Sylow subgroup of G is P-subnormal in G. A group G = AB with P-subnormal w-supersoluble subgroups A and B is studied. The structure of its w-supersoluble residual is obtained. In particular, it coincides with the nilpotent residual of the A-residual of G. Here A is the formation of all groups with abelian Sylow subgroups. Besides, we obtain new sufficient conditions for the w-supersolubility of such group G.
URI: http://elib.gsu.by/jspui/handle/123456789/17551
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