Abstract
The pentagram map is defined on the space of convex n-gons (considered up to projective equivalence) by drawing the diagonals that join second-nearest-neighbors in an n-gon and taking the new n-gon formed by the intersections. We prove that th is map is recurrent; thus, for almost any starting polygon, repeated application of the pentagram map will show a near copy of the starting polygon appear infinitely often under various perspectives.
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