We consider the problem of 2-coloring geometric hypergraphs. Specifically, we show that there is a constant m such that any finite set S of points in the plane can be 2-colored such that every axis-parallel square that contains at least m points from S contains points of both colors. Our proof is constructive, that is, it provides a polynomial-time algorithm for obtaining such a 2-coloring. By affine transformations this result immediately applies also when considering homothets of a fixed parallelogram. © Eyal Ackerman, Balázs Keszegh, and Máté Vizer
A coloring of a hypergraph is a mapping of vertices to colors such that no hyperedge is monochromati...
AbstractThe Lovász Local Lemma yields sufficient conditions for a hypergraph to be 2-colourable, tha...
A number of problems concerning sets of points in the plane are studied, e.g. establishing whether i...
We consider the problem of 2-coloring geometric hypergraphs. Specifically, we show that there is a c...
We study whether for a given planar family F there is an m such that any finite set of points can be...
We study whether for a given planar family F there is an m such that any finite set of points can be...
Given a hypergraph H = (V, E) what is the minimum integer λ(H) such that the sub-hypergraph with edg...
AbstractFor every k and r, we construct a finite family of axis-parallel rectangles in the plane suc...
The goal of this paper is to give a new, abstract approach to cover-decomposition and polychromatic ...
The goal of this paper is to give a new, abstract approach to cover-decomposition and polychromatic ...
We study the following geometric hypergraph coloring problem: given a planar point set and an intege...
We prove that every finite set of homothetic copies of a given convex body in the plane can be color...
AbstractWe prove that for every integer k, every finite set of points in the plane can be k-colored ...
AbstractWe prove lower and upper bounds for the chromatic number of certain hypergraphs defined by g...
A hypergraph is properly 2-colorable if each vertex can be colored by one of two colors and no edge ...
A coloring of a hypergraph is a mapping of vertices to colors such that no hyperedge is monochromati...
AbstractThe Lovász Local Lemma yields sufficient conditions for a hypergraph to be 2-colourable, tha...
A number of problems concerning sets of points in the plane are studied, e.g. establishing whether i...
We consider the problem of 2-coloring geometric hypergraphs. Specifically, we show that there is a c...
We study whether for a given planar family F there is an m such that any finite set of points can be...
We study whether for a given planar family F there is an m such that any finite set of points can be...
Given a hypergraph H = (V, E) what is the minimum integer λ(H) such that the sub-hypergraph with edg...
AbstractFor every k and r, we construct a finite family of axis-parallel rectangles in the plane suc...
The goal of this paper is to give a new, abstract approach to cover-decomposition and polychromatic ...
The goal of this paper is to give a new, abstract approach to cover-decomposition and polychromatic ...
We study the following geometric hypergraph coloring problem: given a planar point set and an intege...
We prove that every finite set of homothetic copies of a given convex body in the plane can be color...
AbstractWe prove that for every integer k, every finite set of points in the plane can be k-colored ...
AbstractWe prove lower and upper bounds for the chromatic number of certain hypergraphs defined by g...
A hypergraph is properly 2-colorable if each vertex can be colored by one of two colors and no edge ...
A coloring of a hypergraph is a mapping of vertices to colors such that no hyperedge is monochromati...
AbstractThe Lovász Local Lemma yields sufficient conditions for a hypergraph to be 2-colourable, tha...
A number of problems concerning sets of points in the plane are studied, e.g. establishing whether i...