On the critical exponent in an isoperimetric inequality for chords
Abstract
The problem of maximizing the Lp norms of chords connecting points on a closed curve separated by arclength u arises in electrostatic and quantum--mechanical problems. It is known that among all closed curves of fixed length, the unique maximizing shape is the circle for 1 p 2, but this is not the case for sufficiently large values of p. Here we determine the critical value pc(u) of p above which the circle is not a local maximizer finding, in particular, that pc(12 L)=52. This corrects a claim made in EHL.
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