English

The Reinhardt Conjecture as an Optimal Control Problem

Optimization and Control 2017-03-07 v1 Metric Geometry

Abstract

In 1934, Reinhardt conjectured that the shape of the centrally symmetric convex body in the plane whose densest lattice packing has the smallest density is a smoothed octagon. This conjecture is still open. We formulate the Reinhardt Conjecture as a problem in optimal control theory. The smoothed octagon is a Pontryagin extremal trajectory with bang-bang control. More generally, the smoothed regular 6k+26k+2-gon is a Pontryagin extremal with bang-bang control. The smoothed octagon is a strict (micro) local minimum to the optimal control problem. The optimal solution to the Reinhardt problem is a trajectory without singular arcs. The extremal trajectories that do not meet the singular locus have bang-bang controls with finitely many switching times. Finally, we reduce the Reinhardt problem to an optimization problem on a five-dimensional manifold. (Each point on the manifold is an initial condition for a potential Pontryagin extremal lifted trajectory.) We suggest that the Reinhardt conjecture might eventually be fully resolved through optimal control theory. Some proofs are computer-assisted using a computer algebra system.

Keywords

Cite

@article{arxiv.1703.01352,
  title  = {The Reinhardt Conjecture as an Optimal Control Problem},
  author = {Thomas Hales},
  journal= {arXiv preprint arXiv:1703.01352},
  year   = {2017}
}

Comments

41 pages

R2 v1 2026-06-22T18:35:17.746Z