Polygons inscribed in Jordan curves with prescribed edge ratios
Abstract
Let J be a simple closed curve in Rk (k≥2) that is differentiable with non-zero derivative at a point A0∈ J. For a tuple of positive reals a1,·s,an (n≥3), each of which is less than the sum of the others, we show that there exists a polygon Qn inscribed in J with sides of lengths proportional to (a1,·s,an). As a consequence, we prove the existence of triangle inscribed in J similar to any given triangle.
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