Triangles on planar Jordan C¹-curves
classification
🧮 math.MG
keywords
curvejordanalgebraiccalcconfigurationcontainscurvesdifferential
read the original abstract
We prove that a Jordan $\calc^1$-curve in the plane contains any non-flat triangle up to translation and homothety with positive ratio. This is false if the curve is not $C^1$. The proof uses a bit configuration spaces, differential and algebraic topology as well as the Schoenflies theorem. A partial generalization holds true in higher dimensions.
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