On non self-normalizing subgroups
Abstract
Let n be a non negative integer, and define Dn to be the family of all finite groups having precisely n conjugacy classes of nontrivial subgroups that are not self-normalizing. We are interested in studying the behavior of Dn and its interplay with solvability and nilpotency. We first show that if G belongs to Dn with n 3, then G is solvable of derived length at most 2. We also show that A5 is the unique nonsolvable group in D4, and that SL2(3) is the unique solvable group in D4 whose derived length is larger than 2. For a group G, we define D(G) to be the number of conjugacy classes of nontrivial subgroups that are not self-normalizing. We determine the relationship between D(H × K) and D(H) and D(K). We show that if G is nilpotent and lies in Dn, then G has nilpotency class at most n/2 and its derived length is at most 2 (n/2) + 1. We consider Dn for several classes of Frobenius groups, and we use this classification to classify the groups in D0, D1, D2, and D3. Finally, we show that if G is solvable and lies in Dn with n 3, then G has derived length at most the minimum of n-1 and 3 2 (n+1) + 9.
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