The space of immersed polygons
Abstract
We use the Schwarz-Christoffel formula to show that for every n≥ 3, the space of labelled immersed n-gons in the plane up to similarity is homeomorphic to R2n-4. We then prove that all immersed triangles, quadrilaterals, and pentagons are embedded, from which it follows that the space of labelled simple n-gons up to similarity is homeomorphic to R2n-4 if n∈ \3,4,5\. This was first shown by Gonz\'ales and L\'opez-L\'opez for n=4 and conjectured to be true for every n≥ 5 by Gonz\'alez and Sedano-Mendoza.
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