Abstract
In this paper a necessary and sufficient condition will be given for groups to be V-isologic, with respect to a given variety of groups V. It is also shown that every V-isologism family of a group contains a V-Hopfian group. Finally we show that if G is in the variety V, then every V-covering group of G is a Hopfian group.
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APA
Moghaddam, M. R. R., & Salemkar, A. R. (2000). Some properties on isologism of groups. Journal of the Australian Mathematical Society, 68(1), 1–9. https://doi.org/10.1017/s1446788700001531
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