We study two decomposition problems in combinatorial geometry. The rst part of the thesis deals with the decomposition of multiple coverings of the plane. We say that a pla-nar set is cover-decomposable if there is a constant m such that any m-fold covering of the plane with its translates is decomposable into two disjoint coverings of the whole plane. Pach conjectured that every convex set is cover-decomposable. We verify his conjecture for polygons. Moreover, if m is large enough, depending on k and the polygon, we prove that any m-fold covering can even be decomposed into k coverings. Then we show that the situation is exactly the opposite in three dimensions, for any polyhedron and any m we construct an m-fold covering of the space that...
A coloring of a hypergraph\u27s vertices is polychromatic if every hyperedge contains at least one v...
[[abstract]]In this paper, we extend the work on minimum coverings of Kn with triangles. We prove th...
Consider the following question: does every complete geometric graph K2n have a partition of its edg...
We study two decomposition problems in combinatorial geometry. The first part deals with the decompo...
A planar set P is said to be cover-decomposable if there is a constant k = k(P) such that every k-fo...
We show that for any concave polygon that has no parallel sides and for any k, there is a k-fold cov...
The study of multiple coverings was initiated by Davenport and L. Fejes Tóth more than 50 years ago....
AbstractLet m(k) denote the smallest positive integer m such that any m-fold covering of the plane w...
Abstract. We propose a novel subdivision of the plane that consists of both convex poly-gons and pse...
We shall show that every planar 4-fold covering of K_<3,3> can be decomposed into two planar 2-fold ...
We propose a novel subdivision of the plane that consists of both convex polygons and pseudo-triangl...
A system of sets forms an m-fold covering of a set X if every point of X belongs to at least m of it...
A colouring of a hypergraph's vertices is polychromatic if every hyperedge contains at least one ver...
A system of sets forms an m-fold covering of a set X if every point of X belongs to at least m of it...
We prove that octants are cover-decomposable into multiple coverings, i.e., for any k there is an ...
A coloring of a hypergraph\u27s vertices is polychromatic if every hyperedge contains at least one v...
[[abstract]]In this paper, we extend the work on minimum coverings of Kn with triangles. We prove th...
Consider the following question: does every complete geometric graph K2n have a partition of its edg...
We study two decomposition problems in combinatorial geometry. The first part deals with the decompo...
A planar set P is said to be cover-decomposable if there is a constant k = k(P) such that every k-fo...
We show that for any concave polygon that has no parallel sides and for any k, there is a k-fold cov...
The study of multiple coverings was initiated by Davenport and L. Fejes Tóth more than 50 years ago....
AbstractLet m(k) denote the smallest positive integer m such that any m-fold covering of the plane w...
Abstract. We propose a novel subdivision of the plane that consists of both convex poly-gons and pse...
We shall show that every planar 4-fold covering of K_<3,3> can be decomposed into two planar 2-fold ...
We propose a novel subdivision of the plane that consists of both convex polygons and pseudo-triangl...
A system of sets forms an m-fold covering of a set X if every point of X belongs to at least m of it...
A colouring of a hypergraph's vertices is polychromatic if every hyperedge contains at least one ver...
A system of sets forms an m-fold covering of a set X if every point of X belongs to at least m of it...
We prove that octants are cover-decomposable into multiple coverings, i.e., for any k there is an ...
A coloring of a hypergraph\u27s vertices is polychromatic if every hyperedge contains at least one v...
[[abstract]]In this paper, we extend the work on minimum coverings of Kn with triangles. We prove th...
Consider the following question: does every complete geometric graph K2n have a partition of its edg...