Tight bounds on the maximal perimeter of convex equilateral small polygons

Abstract

A small polygon is a polygon that has diameter one. The maximal perimeter of a convex equilateral small polygon with n=2s sides is not known when s 4. In this paper, we construct a family of convex equilateral small n-gons, n=2s and s 4, and show that their perimeters are within O(1/n4) of the maximal perimeter and exceed the previously best known values from the literature. In particular, for the first open case n=16, our result proves that Mossinghoff's equilateral hexadecagon is suboptimal.