On profinite polyadic groups
Abstract
We study the structure of profinite polyadic groups and we prove that a polyadic topological group (G, f) is profinite, if and only if, it is compact, Hausdorff, totally disconnected. More generally, for a pseudo-variety (or a formation) of finite groups X, we define the class of X-polyadic groups, and we show that a polyadic group (G, f) is pro-X, if and only if, it is compact, Hausdorff, totally disconnected and for every open congruence R, the quotient (G/R, fR) is X-polyadic.
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