On quadrirational pentagon maps
Abstract
We classify rational solutions of a specific type of the set theoretical version of the pentagon equation. That is, we find all quadrirational maps R:(x,y) (u(x,y),v(x,y)), where u, v are two rational functions on two arguments, that serve as solutions of the pentagon equation. Furthermore, provided a pentagon map that admits a partial inverse, we obtain genuine entwining pentagon set theoretical solutions. Finally, we show how to obtain Yang-Baxter maps from entwining pentagon maps.
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