摘要:
H是群G的子群,如果对群G的任意主因子L/K,|G/K:NG/K(HK/KIL/K)|是 π(HK/KIL/K)-数,则称H在G中满足π-性质;如果存在G的子群T使得G=HT,并且HIT≤I≤H,其中I在G中满足π-性质,则称H在G中是π-可补充的。利用子群的π-可补充性,得到了有限群p-幂零性的一个新的判定方法。
Abstract:
Let H be a subgroup G . If every chief factor L/K of G, |G/K:NG/K(HK/KIL/K)| is a π(HK/KIL/K)-number, then H is called satisfying π-property in G. If there exists a subgroup T of G such that G=HT and HIT≤I≤H , where I satisfies π-property in G , then H is called π-supplemented in G . By the property of π-supplemented, some new criterion of p-nilpotency of finite groups is obtained.