NON-ABELIAN TENSOR ABSOLUTE CENTRE OF A GROUP

Mohammad Reza Hassanlee, Mohammad Reza Rajabzadeh Moghaddam, Mohammad Amin Rostamyari

Abstract


Abstract. In 1904, Schur proved his famous result which says that if the central factor group of a given group is finite then so is its derived subgroup. In 1994, Hegarty showed that if the absolute central factor group, G/L(G), is finite then so is its autocommutator subgroup, K(G).

Using the notion of non-abelian tensor product, we introduce the concept of tensor absolute centre, ‎$L^\otimes (G)$, and $K^\otimes(G)=G\otimes {\rm Aut}(G)$. Then under some condition we prove that the finiteness of $G/L^\otimes(G)$ implies that $K^\otimes(G)$ is also finite.


Keywords


Non-abelian tensor product; auto-Engel element; autocommutator subgroup; absolute centre.

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