Polynomial Inscriptions
Abstract
We prove that for every smooth Jordan curve γ ⊂ C and for every set Q ⊂ C of six concyclic points, there exists a non-constant quadratic polynomial p ∈ C[z] such that p(Q) ⊂ γ. The proof relies on a theorem of Fukaya and Irie. We also prove that if Q is the union of the vertex sets of two concyclic regular n-gons, there exists a non-constant polynomial p ∈ C[z] of degree at most n-1 such that p(Q) ⊂ γ. The proof is based on a computation in Floer homology. These results support a conjecture about which point sets Q ⊂ C admit a polynomial inscription of a given degree into every smooth Jordan curve γ.
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