Abstract:
In this paper we study finite groups with $\mathbb{P}$-subnormal biprimary dispersive subgroups.
We prove that a group all of whose biprimary $p$-closed $pd$-subgroups are $\mathbb{P}$-subnormal is
$p$-solvable, where $p$ is the largest prime divisor of the order of the group. We also prove that a group
with biprimary $2$-nilpotent $\mathbb{P}$-subnormal $2d$-subgroups is solvable.
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