AbstractAn edge in a drawing of a graph is called even if it intersects every other edge of the graph an even number of times. Pach and Tóth proved that a graph can always be redrawn so that its even edges are not involved in any intersections. We give a new and significantly simpler proof of the stronger statement that the redrawing can be done in such a way that no new odd intersections are introduced. We include two applications of this strengthened result: an easy proof of a theorem of Hanani and Tutte (the only proof we know of not to use Kuratowski's theorem), and the new result that the odd crossing number of a graph equals the crossing number of the graph for values of at most 3. The paper begins with a disarmingly simple proof of a...
Given a graph G and a subset F ⊆ E(G) of its edges, is there a drawing of G in which all edges of F ...
Let G be a drawing of a graph with n vertices and e > 4n edges, in which no two adjacent edges cross...
We study the existence of edges having few crossings with the other edges in drawings of the complet...
An edge in a drawing of a graph is called even if it intersects every other edge of the graph an eve...
An edge in a drawing of a graph is called $\textit{even}$ if it intersects every other edge of the g...
AbstractAn edge in a drawing of a graph is called even if it intersects every other edge of the grap...
AbstractA drawing of a graph G is a mapping which assigns to each vertex a point of the plane and to...
The crossing number of a graph is the minimum number of edge intersections in a plane drawing of a g...
AbstractIn this paper we investigate how certain results related to the Hanani–Tutte theorem can be ...
If a graph can be drawn on the torus so that every two independent edges cross an even number of tim...
In a drawing of a graph, two edges form an odd pair if they cross each other an odd number of times....
We revoke the problem of drawing graphs in the plane so that only certain specified pairs of edges a...
The drawing of the complete graph in which the vertices are placed on the rims of a cylinder and con...
Let G be a graph drawn in the plane so that its edges are represented by x-monotone curves, any pair...
AbstractWe study the existence of edges having few crossings with the other edges in drawings of the...
Given a graph G and a subset F ⊆ E(G) of its edges, is there a drawing of G in which all edges of F ...
Let G be a drawing of a graph with n vertices and e > 4n edges, in which no two adjacent edges cross...
We study the existence of edges having few crossings with the other edges in drawings of the complet...
An edge in a drawing of a graph is called even if it intersects every other edge of the graph an eve...
An edge in a drawing of a graph is called $\textit{even}$ if it intersects every other edge of the g...
AbstractAn edge in a drawing of a graph is called even if it intersects every other edge of the grap...
AbstractA drawing of a graph G is a mapping which assigns to each vertex a point of the plane and to...
The crossing number of a graph is the minimum number of edge intersections in a plane drawing of a g...
AbstractIn this paper we investigate how certain results related to the Hanani–Tutte theorem can be ...
If a graph can be drawn on the torus so that every two independent edges cross an even number of tim...
In a drawing of a graph, two edges form an odd pair if they cross each other an odd number of times....
We revoke the problem of drawing graphs in the plane so that only certain specified pairs of edges a...
The drawing of the complete graph in which the vertices are placed on the rims of a cylinder and con...
Let G be a graph drawn in the plane so that its edges are represented by x-monotone curves, any pair...
AbstractWe study the existence of edges having few crossings with the other edges in drawings of the...
Given a graph G and a subset F ⊆ E(G) of its edges, is there a drawing of G in which all edges of F ...
Let G be a drawing of a graph with n vertices and e > 4n edges, in which no two adjacent edges cross...
We study the existence of edges having few crossings with the other edges in drawings of the complet...