What is the largest area possible for the convex hull of a path of unit length lying on a plane? For what paths is that largest area attained?
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1$\begingroup$ By "largest", do you mean largest area? $\endgroup$– Mark MeckesCommented Sep 9, 2013 at 9:32
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1$\begingroup$ Yes, the convex hull having the largest area. $\endgroup$– ARiCommented Sep 9, 2013 at 9:47
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2$\begingroup$ The same question seems even more intriguing in dimension $3$. $\endgroup$– Benoît KloecknerCommented Sep 9, 2013 at 21:05
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$\begingroup$ It may just be an open problem in Dimension 3, see here on MO. $\endgroup$– ARiCommented Sep 11, 2013 at 15:04
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1 Answer
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The answer seems to be $\frac{1}{2\pi}$, using a semi circle. See
answered Sep 9, 2013 at 9:36
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3$\begingroup$ "Seems" seems to be an understatement. Moran also proves that the semicircle is the unique maximizer. $\endgroup$– MishaCommented Sep 9, 2013 at 10:43
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1$\begingroup$ @Misha Yes. There are many variants of this question, for example taking an circle instead of an interval. See here for an overview. $\endgroup$ Commented Sep 9, 2013 at 10:59