English

Extremal problems on triangle areas in two and three dimensions

Combinatorics 2013-12-17 v1

Abstract

The study of extremal problems on triangle areas was initiated in a series of papers by Erd\H{o}s and Purdy in the early 1970s. In this paper we present new results on such problems, concerning the number of triangles of the same area that are spanned by finite point sets in the plane and in 3-space, and the number of distinct areas determined by the triangles. In the plane, our main result is an O(n44/19)=O(n2.3158)O(n^{44/19}) =O(n^{2.3158}) upper bound on the number of unit-area triangles spanned by nn points, which is the first breakthrough improving the classical bound of O(n7/3)O(n^{7/3}) from 1992. We also make progress in a number of important special cases: We show that (i) For points in convex position, there exist nn-element point sets that span Ω(nlogn)\Omega(n\log n) triangles of unit area. (ii) The number of triangles of minimum (nonzero) area determined by nn points is at most 2/3(n2n){2/3}(n^2-n); there exist nn-element point sets (for arbitrarily large nn) that span (6/π2o(1))n2(6/\pi^2-o(1))n^2 minimum-area triangles. (iii) The number of acute triangles of minimum area determined by nn points is O(n); this is asymptotically tight. (iv) For nn points in convex position, the number of triangles of minimum area is O(n); this is asymptotically tight. (v) If no three points are allowed to be collinear, there are nn-element point sets that span Ω(nlogn)\Omega(n\log n) minimum-area triangles (in contrast to (ii), where collinearities are allowed and a quadratic lower bound holds). In 3-space we prove an O(n17/7β(n))=O(n2.4286)O(n^{17/7}\beta(n))= O(n^{2.4286}) upper bound on the number of unit-area triangles spanned by nn points, where β(n)\beta(n) is an extremely slowly growing function related to the inverse Ackermann function. The best previous bound, O(n8/3)O(n^{8/3}), is an old result from 1971.

Keywords

Cite

@article{arxiv.0710.4109,
  title  = {Extremal problems on triangle areas in two and three dimensions},
  author = {Adrian Dumitrescu and Micha Sharir and Csaba D. Toth},
  journal= {arXiv preprint arXiv:0710.4109},
  year   = {2013}
}

Comments

title page + 27 pages, 5 figures

R2 v1 2026-06-21T09:34:47.222Z