Pavel Exner, Martin Fraas, Evans M. Harrell II
Published 2007-03-05Version 1
The problem of maximizing the $L^p$ 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 $1 \le p \le 2$, but this is not the case for sufficiently large values of $p$. Here we determine the critical value $p_c(u)$ of $p$ above which the circle is not a local maximizer finding, in particular, that $p_c(\frac12 L)=\frac52$. This corrects a claim made in \cite{EHL}.
Comments: LaTeX, 12 pages, with 1 eps figure
Related articles:
Critical exponent for the magnetization of the weakly coupled $φ^4_4$ model
A lower bound for the ground state energy of a Schroedinger operator on a loop
Epstein curves and holography of the Schwarzian action
