We prove that, in a finite soluble group, all of whose Sylow normalisers are super-soluble, the Fitting length is at most 2m + 2, where p m is the highest power of the smallest prime p dividing |G/G s| here G s is the supersoluble residual of G. The bound 2m + 2 is best possible. However under certain structural constraints on G/G S, typical of the small examples one makes by way of experimentation, the bound is sharply reduced. More precisely let p be the smallest, and r the largest, prime dividing the order of a group G in the class under consideration. If a Sylow p”subgroup of G/G S acts faithfully on every r-chief factor of G/G S, then G has Fitting length at most 3.
Bounds on the Fitting length of finite soluble groups with supersoluble Sylow normalisers / R. A. Bryce; V. Fedri; L. Serena. - In: BULLETIN OF THE AUSTRALIAN MATHEMATICAL SOCIETY. - ISSN 0004-9727. - STAMPA. - 44:(1991), pp. 19-31. [10.1017/S0004972700029427]
Bounds on the Fitting length of finite soluble groups with supersoluble Sylow normalisers
SERENA, LUIGI
1991
Abstract
We prove that, in a finite soluble group, all of whose Sylow normalisers are super-soluble, the Fitting length is at most 2m + 2, where p m is the highest power of the smallest prime p dividing |G/G s| here G s is the supersoluble residual of G. The bound 2m + 2 is best possible. However under certain structural constraints on G/G S, typical of the small examples one makes by way of experimentation, the bound is sharply reduced. More precisely let p be the smallest, and r the largest, prime dividing the order of a group G in the class under consideration. If a Sylow p”subgroup of G/G S acts faithfully on every r-chief factor of G/G S, then G has Fitting length at most 3.
I documenti in FLORE sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
