On the permutability of Sylow subgroups with derived subgroups of B-subgroups

Abstract

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A finite non-nilpotent group G is called a B-group if every proper subgroup of the quotient group G/Φ(G) is nilpotent. We establish the r-solvability of the group in which some Sylow r-subgroup permutes with the derived subgroups of 2-nilpotent (or 2-closed) B-subgroups of even order and the solvability of the group in which the derived subgroups of 2-closed and 2-nilpotent B-subgroups of even order are permutable.

Keywords

• finite group
• r-solvable group
• sylow subgroup
• b-group
• the derived subgroup
• permutable subgroups