On the square peg problem
Abstract
We show that if γ is a Jordan curve in R2 which is close to a C2 Jordan curve β in R2, then γ contains an inscribed square. In particular, if > 0 is the maximum unsigned curvature of β and there is a map f from the image of γ to the image of β with ||f(x) - x|| < 110 and f γ having winding number 1, then γ has an inscribed square of positive sidelength.
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