Some special classes of n-abelian groups

Some special classes of n-abelian groups

Let n be an integer. A group G is said to be n-abelian if the map phi_n that sends g to g^n is an endomorphism of G. Then (xy)^n=x^ny^n for all x,y in G, from which it follows [x^n,y]=[x,y]^n=[x,y^n]. It is also easy to see that a group G is n-abelian if and only if it is (1-n)-abelian. If nneq 0,1...

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Bibliographic Details
Main Authors: Costantino Delizia, Antonio Tortora
Format: Article
Language:English
Published: University of Isfahan 2012-06-01
Series:International Journal of Group Theory
Subjects:
n-abelian group
abelian group
finite exponent
Online Access:http://www.theoryofgroups.ir/?_action=showPDF&article=474&_ob=8c61e9cf538261805804cae1cfb096f9&fileName=full_text.pdf

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