On generalized covering and avoidance properties of finite groups and saturated fusion systems
Abstract
A subgroup A of a finite group G is said to be a CAP-subgroup of G, if for any chief factor H/K of G, either A H= AK or A H = A K. Let p be a prime, S be a p-group and F be a saturated fusion system over S. Then F is said to be supersolvable, if there exists a series of S, namely 1 = S0 ≤ S1 ≤ ·s ≤ Sn = S, such that Si+1/Si is cyclic, and Si is strongly F-closed for any i=0,1,·s,n. In this paper, we first introduce the concept of strong p-CAP-subgroups, and investigate the structure of finite groups under the assumptions that some subgroups of G are partial CAP-subgroups or strong (p)-CAP-subgroups of G, and obtain some criteria for a group G to be p-supersolvable. After that, we investigate the characterizations for supersolvability of FS (G) under the assumptions that some subgroups of G are partial CAP-subgroups or strong (p)-CAP-subgroups of G, and obtain some criteria for a fusion system FS (G) to be supersolvable. The above results improve some known results and develop some new results about CAP-subgroups from fusion systems.
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