On the conjecture of groups with the same number of centralizer
Abstract
For any group G, let cent(G) denote the set of all centralizers of G. The authors in KZ, Groups with the same number of centralizers, J. Algebra Appl. (2021) 2150012 (6 pages), posed the following conjecture: Let G and S be finite groups. Is it true that if |Cent(G)|=|Cent(S)| and |G'|=|S'|, then G is isoclonic to S? In this paper, among other things, we give a negative answer to this conjecture.
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