English

Self-Intersecting Periodic Curves in the Plane

Differential Geometry 2010-11-10 v1 Geometric Topology

Abstract

Suppose a smooth planar curve γ\gamma is 2π2\pi-periodic in the xx direction and the length of one period is \ell. It is shown that if γ\gamma self-intersects, then it has a segment of length 2π\ell- 2\pi on which it self-intersects and somewhere its curvature is at least 2π/(2π)2\pi/(\ell - 2\pi). The proof involves the projection Γ\Gamma of γ\gamma onto a cylinder. (The complex relation between γ\gamma and Γ\Gamma was recently observed analytically by T. M. Apostol and M. A. Mnatsakanian. When γ\gamma is in general position there is a bijection between self-intersection points of γ\gamma modulo the periodicity, and self-intersection points of Γ\Gamma with winding number 0 around the cylinder. However, our proof depends on the observation that a loop in Γ\Gamma with winding number 1 leads to a self-intersection point of γ\gamma.

Keywords

Cite

@article{arxiv.1011.2128,
  title  = {Self-Intersecting Periodic Curves in the Plane},
  author = {J Howie and J F Toland},
  journal= {arXiv preprint arXiv:1011.2128},
  year   = {2010}
}

Comments

6 pages; 4 fgures

R2 v1 2026-06-21T16:41:15.346Z