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On Capable groups of order p^2q

Published 8 Nov 2019 in math.GR | (1911.03279v3)

Abstract: A group is said to be capable if it is the central factor of some group. In this paper, among other results we have characterized capable groups of order $p2q$, for any distinct primes $p, q$, which extends Theorem 1.2 of S. Rashid, N. H. Sarmin, A. Erfanian, and N. M. Mohd Ali, {\em On the non abelian tensor square and capability of groups of order $p2q$}, Arch. Math., \textbf{97} (2011), 299--306. We have also computed the number of distinct element centralizers of a group (finite or infinite) with central factor of order $p3$, which extends Proposition 2.10 of S. M. Jafarian Amiri, H. Madadi and H. Rostami, {\em On $F$-groups with the central factor of order $p4$}, Math. Slovaca, \textbf{67} (5) (2017), 1147--1154.

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