Necklaces with interacting beads: isoperimetric problems
Abstract
We discuss a pair of isoperimetric problems which at a glance seem to be unrelated. The first one is classical: one places identical point charges at a closed curve at the same arc-length distances and asks about the energy minimum, i.e. which shape does the loop take if left by itself. The second problem comes from quantum mechanics: we take a Schr\"odinger operator in with identical point interaction placed at a loop in the described way, and ask about the configuration which \emph{maximizes} the ground state energy. We reduce both of them to geometric inequalities which involve chords of ; it will be shown that a sharp local extremum is in both cases reached by in the form of a regular (planar) polygon and that such a solves the two problems also globally.
Cite
@article{arxiv.math-ph/0508061,
title = {Necklaces with interacting beads: isoperimetric problems},
author = {Pavel Exner},
journal= {arXiv preprint arXiv:math-ph/0508061},
year = {2007}
}
Comments
AMSTeX, 9 pages