English

Optimal embedded and enclosing isosceles triangles

Metric Geometry 2022-05-25 v1

Abstract

Given a triangle Δ\Delta, we study the problem of determining the smallest enclosing and largest embedded isosceles triangles of Δ\Delta with respect to area and perimeter. This problem was initially posed by Nandakumar and was first studied by Kiss, Pach, and Somlai, who showed that if Δ\Delta' is the smallest area isosceles triangle containing Δ\Delta, then Δ\Delta' and Δ\Delta share a side and an angle. In the present paper, we prove that for any triangle Δ\Delta, every maximum area isosceles triangle embedded in Δ\Delta and every maximum perimeter isosceles triangle embedded in Δ\Delta shares a side and an angle with Δ\Delta. Somewhat surprisingly, the case of minimum perimeter enclosing triangles is different: there are infinite families of triangles Δ\Delta whose minimum perimeter isosceles containers do not share a side and an angle with Δ\Delta.

Keywords

Cite

@article{arxiv.2205.11637,
  title  = {Optimal embedded and enclosing isosceles triangles},
  author = {Aron Ambrus and Monika Csikos and Gergely Kiss and Janos Pach and Gabor Somlai},
  journal= {arXiv preprint arXiv:2205.11637},
  year   = {2022}
}
R2 v1 2026-06-24T11:26:17.205Z