Fitting's theorem
Fitting's theorem is a mathematical theorem proved by Hans Fitting.[1] It can be stated as follows:
- If M and N are nilpotent normal subgroups of a group G, then their product MN is also a nilpotent normal subgroup of G; if, moreover, M is nilpotent of class m and N is nilpotent of class n, then MN is nilpotent of class at most m + n.[2]
By induction it follows also that the subgroup generated by a finite collection of nilpotent normal subgroups is nilpotent. This can be used to show that the Fitting subgroup of certain types of groups (including all finite groups) is nilpotent. However, a subgroup generated by an infinite collection of nilpotent normal subgroups need not be nilpotent.[3]
References
Template:Abstract-algebra-stub
- ↑ Script error: No such module "citation/CS1".; see Hilfsatz 10 (unnumbered in text), p. 100
- ↑ Script error: No such module "citation/CS1".
- ↑ Template:Harvtxt, Lemma 7.18 and Remark 7.8, p. 297