An inequality for the maximum curvature through a geometric flow
classification
🧮 math.SP
math.APmath.DGmath.OC
keywords
curvaturecurveflowinequalitymathrmmaximumproofarea
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We provide a new proof of the following inequality: the maximum curvature $k_\mathrm{max}$ and the enclosed area $A$ of a smooth Jordan curve satisfy $k_\mathrm{max}\ge \sqrt{\pi/A}$. The feature of our proof is the use of the curve shortening flow.
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