On Intersections of -Hall Subgroups of Some D_-Groups

Key Points

• This research aims to explore the structure of D_pi-groups with specific properties related to their solvable radical and normal pi-subgroups.
• Analyzed D_pi-groups that have a trivial solvable radical and lack nontrivial normal pi-subgroups.
• Examined the subnormal series of these groups, focusing on their simple nonabelian factors.
• Proved the existence of an element g for any pi-Hall subgroup H such that H intersects with its conjugate H^g trivially.
• Established that for any pi-Hall subgroup H in the studied D_pi-groups, the intersection H∩H^g equals 1.
• Resolved Problem 20.123(c) from the Kourovka Notebook relating to these groups.
• Provided a positive answer to Problem 18.31 under the defined group conditions.