On the ICSPC-property of finite subgroups
Abstract
Let G be a finite group and H be a subgroup of G. Then H is said to be a p-CAP-subgroup of G, if H covers or avoids any pd-chief factor of G. Furthermore, H is said to be a strong p-CAP-subgroup of G, if for any H ≤ K ≤ G, H is a p-CAP-subgroup of K. A subgroup L is called an ICSPC-subgroup of G, if [L,G] L ≤ LspcG, where LspcG denotes a strong p-CAP-subgroup of G contained in L. In this paper, we investigate the structure of G under the assumption that certain subgroups of G are ICSPC-subgroups of G. Characterizations for p-nilpotency and solvably saturated formation are obtained. We also get several criteria for the structure of G under the assumption that certain subgroups of G are ICSPC-subgroups of G.
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