English

A note on Hurwitz's inequality

Differential Geometry 2019-05-24 v2

Abstract

Given a simple closed plane curve Γ\Gamma of length LL enclosing a compact convex set KK of area FF, Hurwitz found an upper bound for the isoperimetric deficit, namely L24πFπFeL^2-4\pi F\leq \pi |F_{e}|, where FeF_{e} is the algebraic area enclosed by the evolute of Γ\Gamma. In this note we improve this inequality finding strictly positive lower bounds for the deficit πFeΔ\pi|F_{e}|-\Delta, where Δ=L24πF\Delta=L^{2}-4\pi F. These bounds involve wether the visual angle of Γ\Gamma or the pedal curve associated to KK with respect to the Steiner point of KK or the L2\mathcal{L}^{2} distance between KK and the Steiner disk of KK. For each established inequality we study when equality holds. This occurs for those compact convex sets being bounded by a curve parallel to an hypocycloid of 3,43, 4 or 55 cusps or the Minkowski sum of this kind of sets.

Keywords

Cite

@article{arxiv.1704.00944,
  title  = {A note on Hurwitz's inequality},
  author = {Julià Cufí and Eduardo Gallego and Agustí Reventós},
  journal= {arXiv preprint arXiv:1704.00944},
  year   = {2019}
}

Comments

15 pages, 3 figures

R2 v1 2026-06-22T19:07:05.394Z