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Erd\H{o}s asked the following question: given $n$ points in the plane in almost general position (no 4 collinear), how large a set can we guarantee to find that is in general position (no 3 collinear)? F\"uredi constructed a set of $n$…

Combinatorics · Mathematics 2016-01-28 Luka Milićević

Let $E(k, \ell)$ denote the smallest integer such that any set of at least $E(k, \ell)$ points in the plane, no three on a line, contains either an empty convex polygon with $k$ vertices or an empty pseudo-triangle with $\ell$ vertices. The…

Combinatorics · Mathematics 2012-10-18 Bhaswar B. Bhattacharya , Sandip Das

The Sylvester-Gallai theorem states that for a finite set of points in the plane, if every line determined by any two of these points also contains a third, then the set is necessarily made of collinear points. In this paper, we first…

Combinatorics · Mathematics 2025-12-17 Imre Barany , Julia Q. Du , Dan Schwarz , Liping Yuan , Tudor Zamfirescu

We show that if a planar graph $G$ has a plane straight-line drawing in which a subset $S$ of its vertices are collinear, then for any set of points, $X$, in the plane with $|X|=|S|$, there is a plane straight-line drawing of $G$ in which…

Combinatorics · Mathematics 2021-05-11 Vida Dujmović , Fabrizio Frati , Daniel Gonçalves , Pat Morin , Günter Rote

A {\em convex hole} (or {\em empty convex polygon)} of a point set $P$ in the plane is a convex polygon with vertices in $P$, containing no points of $P$ in its interior. Let $R$ be a bounded convex region in the plane. We show that the…

Computational Geometry · Computer Science 2012-06-06 József Balogh , Hernán González-Aguilar , Gelasio Salazar

Suppose that each proper subset of a set $S$ of points in a vector space is contained in the union of planes of specified dimensions, but $S$ itself is not contained in any such union. How large can $|S|$ be? We prove a general upper bound…

Combinatorics · Mathematics 2025-02-14 Hailong Dao , Manik Dhar , Izabella Łaba , Ben Lund

A pentagonal geometry PENT($k$, $r$) is a partial linear space, where every line is incident with $k$ points, every point is incident with $r$ lines, and for each point $x$, there is a line incident with precisely those points that are not…

Combinatorics · Mathematics 2021-04-20 Anthony D. Forbes , Carrie G. Rutherford

We give a construction of an infinite set of points $A$ in $\mathbb{R}^2$ such that any subset $P\subseteq A$ has a constant density subset $P'$ with no three points collinear and yet $A$ cannot be separated into finitely many subsets such…

Combinatorics · Mathematics 2026-02-26 Moe Putterman , Mehtaab Sawhney , Gregory Valiant

Let $S$ be a set of $n$ points in general position in the plane, and let $X_{k,\ell}(S)$ be the number of convex $k$-gons with vertices in $S$ that have exactly $\ell$ points of $S$ in their interior. We prove several equalities for the…

Combinatorics · Mathematics 2019-10-22 Clemens Huemer , Deborah Oliveros , Pablo Pérez-Lantero , Ferran Torra , Birgit Vogtenhuber

We prove that every $n$ vertex linear triple system with $m$ edges has at least $m^6/n^7$ copies of a pentagon, provided $m>100 \, n^{3/2}$. This provides the first nontrivial bound for a question posed by Jiang and Yepremyan. More…

Combinatorics · Mathematics 2025-02-18 Dhruv Mubayi , Jozsef Solymosi

This paper proves a 2017 conjecture of De Loera, La Haye, Oliveros, and Rold\'an-Pensado that the "prime grid" $\big\{(p,q) \in \mathbb{Z}^2 : \text{$p$ and $q$ are prime}\big\} \subseteq \mathbb{R}^2$ contains empty polygons with…

Combinatorics · Mathematics 2024-11-19 Travis Dillon

Satisfiability solving has been used to tackle a range of long-standing open math problems in recent years. We add another success by solving a geometry problem that originated a century ago. In the 1930s, Esther Klein's exploration of…

Computational Geometry · Computer Science 2024-03-04 Marijn J. H. Heule , Manfred Scheucher

By a polygonization of a finite point set $S$ in the plane we understand a simple polygon having $S$ as the set of its vertices. Let $B$ and $R$ be sets of blue and red points, respectively, in the plane such that $B\cup R$ is in general…

Combinatorics · Mathematics 2009-12-16 Radoslav Fulek , Balázs Keszegh , Filip Morić , Igor Uljarević

We prove that if a finite point set in real space does not have too many points on a plane, then it spans a quadratic number of ordinary lines. This answers the real case of a question of Basit, Dvir, Saraf, and Wolf. It shows that there is…

Combinatorics · Mathematics 2018-03-28 Frank de Zeeuw

We establish some new theorems on pentagon and pentagram.

History and Overview · Mathematics 2019-08-06 Tran Quang Hung

Given a collection of points in the plane, classifying which subsets are collinear is a natural problem and is related to classical geometric constructions. We consider collections of points in a projective plane over a finite field such…

Algebraic Geometry · Mathematics 2023-11-29 Andrei Staicu

We show that every packing of congruent regular pentagons in the Euclidean plane has density at most $(5-\sqrt5)/3$, which is about 0.92. More specifically, this article proves the pentagonal ice-ray conjecture of Henley (1986), and…

Metric Geometry · Mathematics 2016-09-14 Thomas Hales , Wöden Kusner

A matching is compatible to two or more labeled point sets of size $n$ with labels $\{1,\dots,n\}$ if its straight-line drawing on each of these point sets is crossing-free. We study the maximum number of edges in a matching compatible to…

Computational Geometry · Computer Science 2022-09-07 Oswin Aichholzer , Alan Arroyo , Zuzana Masárová , Irene Parada , Daniel Perz , Alexander Pilz , Josef Tkadlec , Birgit Vogtenhuber

A set S of 2n+1 points in the plane is said to be in general position if no three points of S are collinear and no four are concyclic. A circle is called halving with respect to S if it has three points of S on its circumference, n-1 points…

Combinatorics · Mathematics 2007-05-23 Federico Ardila

Given $n$ points in the plane, a \emph{covering path} is a polygonal path that visits all the points. If no three points are collinear, every covering path requires at least $n/2$ segments, and $n-1$ straight line segments obviously suffice…

Combinatorics · Mathematics 2013-03-04 Adrian Dumitrescu , Daniel Gerbner , Balazs Keszegh , Csaba D. Toth