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2 votes
1 answer
84 views

What is the average component size of a coloring?

Supose each cell of a big (or infinite) grid is colored at random by one of $k$ colors. Then the connected monochromatic components (here components are not supposed to contain "wasp waists",...
Wolfgang's user avatar
  • 13.4k
5 votes
0 answers
235 views

Arrangement of points, lines, and planes

Is it possible to construct a finite nontrivial arrangement of points, lines, and planes in 3-dimensional Euclidean space with the following properties? every line is incident with four points and ...
Daniel Sebald's user avatar
22 votes
1 answer
886 views

Happy ants never leave compact domain?

I am curious if the following seemingly simple question has an easy answer? Consider an ant population of $N$ ants that lives in $\mathbb R^2$. Each ant can be labeled by some coordinate $x\in \mathbb ...
Pritam Bemis's user avatar
5 votes
1 answer
177 views

Orientations of triples of points in the plane

Given a finite indexing-set $I$ and a collection $P = \{P_i: \ i \in I\}$ of points in the plane no three of which are collinear, let $I_{(3)}$ denote the set of ordered triples of distinct elements ...
James Propp's user avatar
  • 19.7k
4 votes
2 answers
94 views

Finding a not too slim triangulation with prescribed vertices on $\mathbb R^2$

Let us fix a constant $r>1$. Let $d(x,y)$ denote the distance between points $x,y\in \mathbb R^2$. Suppose we have a discreet subset $X\subset \mathbb R^2$ such that 1) For any two points $x,x'\...
aglearner's user avatar
  • 14.3k
6 votes
1 answer
429 views

Bichromatic pencils

A pencil is a collection of some lines through a point, called the center of the pencil. If the points of the plane are colored, then call a pencil bichromatic if there is a color that is present on ...
domotorp's user avatar
  • 19k
10 votes
1 answer
277 views

Optimization of points on a plane

Suppose we have $n$ points on a plane. Let $D$ be the sum of the squares of all the pairwise distances between the points. Let $A$ be the area of the convex hull. What is the minimum possible value of ...
Halbort's user avatar
  • 1,129
20 votes
1 answer
452 views

Hidden points in polygons

Let $h(n)$ be the largest number of mutually invisible points that can be located in a polygon $P$ of $n$ vertices. Two points $x$ and $y$ are mutually invisible if the segment $xy$ contains a point ...
Joseph O'Rourke's user avatar
14 votes
2 answers
878 views

Sets of evenly distributed points in the Euclidean plane

Is there a set $P \subset \mathbb{R}^2$ of points in the Euclidean plane whose intersection with every convex subset of $\mathbb{R}^2$ of area $1$ is nonempty but finite? If the answer is yes, can $P$...
Stefan Kohl's user avatar
  • 19.6k
16 votes
2 answers
1k views

Are Penrose tilings universal? Do aperiodic universal tilings exist?

Consider a tiling of the plane using tiles of at least two types (e.g, a Penrose tiling such as that shown at the bottom of this question, which tiles the plane with two types of tiles). List the tile ...
Louigi Addario-Berry's user avatar