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A complete classification of all finite bijective set-theoretic solutions (S, s) to the Pentagon Equation is obtained. First, it is shown that every such a solution determines a semigroup structure on the set S that is the direct product E G of a semigroup of left zeros E and a group G. Next, we prove that this leads to a decomposition of the set S as a Cartesian product X A G, for some sets X, A and to a discovery of a hidden group structure on A. Then an unexpected structure of a matched product of groups A, G is found such that the solution (S, s) can be explicitly described as a lift of a solution determined on the set A G by this matched product of groups. Conversely, every matched product of groups leads to a family of solutions arising in this way. Moreover, a simple criterion for the isomorphism of two solutions is obtained. The results provide a far reaching extension of the results of Colazzo, Jespers and Kubat, dealing with the special case of the so called involutive solutions. Connections to the solutions to the Yang--Baxter equation and to the theory of skew braces are derived.
Colazzo et al. (Thu,) studied this question.