Journal of the London Mathematical Society Advance Access originally published online on September 24, 2007
Journal of the London Mathematical Society 2007 76(1):237-252; doi:10.1112/jlms/jdm050
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© 2007 London Mathematical Society
On subnormality criteria for subgroups in finite groups
Dipartimento di Matematica ‘Ulisse Dini’
Università degli Studi di Firenze
viale Morgagni 67A
50134 Firenze
Italy
Let H be a subgroup of a finite group G and let 
be the set of all elements g of G such that H is subnormal in 
H, Hg
. A result of Wielandt states that H is subnormal in G if and only if 
. In this paper, we let A be a subgroup of G contained in and ask if this implies (and therefore is equivalent to) the subnormality of H in H, A. We show with an example that the answer is no, even for soluble groups with Sylow subgroups of nilpotency class at most 2. However, we prove that the two conditions are equivalent whenever A either is subnormal in G or has p-power index in G (for p any prime number).
fumagalli{at}math.unifi.it
2000 Mathematics Subject Classification 20D35.
This work was partially supported by the MURST research program ‘Teoria dei gruppi e applicazioni’.
Received September 7, 2005; revised November 22, 2006; published online September 24, 2007.