Let $p:X\to G$ be an $n$-fold covering of a compact group $G$ by a connected topological space $X$. Then there exists a group structure in $X$ turning $p$ into a homomorphism between compact groups. As an application, we describe all $n$-fold coverings of a compact connected abelian group. Also, a criterion of triviality for $n$-fold coverings in terms of the dual group and the one-dimensional $\check{C}$ech cohomology group is obtained.
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