International audienceSquaregraphs were originally defined as finite plane graphs in which all inner faces are quadrilaterals (i.e., 4-cycles) and all inner vertices (i.e., the vertices not incident with the outer face) have degrees larger than three. The planar dual of a finite squaregraph is determined by a triangle-free chord diagram of the unit disk, which could alternatively be viewed as a triangle-free line arrangement in the hyperbolic plane. This representation carries over to infinite plane graphs with finite vertex degrees in which the balls are finite squaregraphs. Algebraically, finite squaregraphs are median graphs for which the duals are finite circular split systems. Hence squaregraphs are at the crosspoint of two dualities, ...
The n-th power (n 1) of a graph G = (V; E), written G n , is defined to be the graph having V as ...
We prove a conjecture of Dvořák, Král, Nejedlý, and Škrekovski that planar graphs of girth at l...
AbstractA graph is pseudo-median if for every triple u, v, w of vertices there exists either a uniqu...
Median graphs are connected graphs in which for all three vertices there is a unique vertex that bel...
International audienceThe square of a given graph $H = (V, E)$ is obtained from $H$ by adding an edg...
AbstractLet G be a cube-free median graph. It is proved that k/2⩾n-1⩾m/2n⩾s⩾r-1, where n, m, s, k, a...
AbstractWe prove that the non-trivial (finite or infinite) weakly median graphs which are undecompos...
Graph G is the square of graph H if two vertices x, y have an edge in G if and only if x, y are of d...
This talk is a report of joint work done with Mark Watkins [2]. It represents the start of an extens...
AbstractGraph bundles generalize the notion of covering graphs and graph products. In Imrich et al. ...
The square of a graph G, denoted by G(2), is obtained from G by putting an edge between two distinct...
AbstractWe show that regular median graphs of linear growth are the Cartesian product of finite hype...
Median graphs are a natural generalisation of trees and hypercubes that are closely related to distr...
A simple quadrangulation of the sphere is a finite simple graph embedded on the sphere such that eve...
In this book for the first time the authors study the new type of Euclid squares in various planes l...
The n-th power (n 1) of a graph G = (V; E), written G n , is defined to be the graph having V as ...
We prove a conjecture of Dvořák, Král, Nejedlý, and Škrekovski that planar graphs of girth at l...
AbstractA graph is pseudo-median if for every triple u, v, w of vertices there exists either a uniqu...
Median graphs are connected graphs in which for all three vertices there is a unique vertex that bel...
International audienceThe square of a given graph $H = (V, E)$ is obtained from $H$ by adding an edg...
AbstractLet G be a cube-free median graph. It is proved that k/2⩾n-1⩾m/2n⩾s⩾r-1, where n, m, s, k, a...
AbstractWe prove that the non-trivial (finite or infinite) weakly median graphs which are undecompos...
Graph G is the square of graph H if two vertices x, y have an edge in G if and only if x, y are of d...
This talk is a report of joint work done with Mark Watkins [2]. It represents the start of an extens...
AbstractGraph bundles generalize the notion of covering graphs and graph products. In Imrich et al. ...
The square of a graph G, denoted by G(2), is obtained from G by putting an edge between two distinct...
AbstractWe show that regular median graphs of linear growth are the Cartesian product of finite hype...
Median graphs are a natural generalisation of trees and hypercubes that are closely related to distr...
A simple quadrangulation of the sphere is a finite simple graph embedded on the sphere such that eve...
In this book for the first time the authors study the new type of Euclid squares in various planes l...
The n-th power (n 1) of a graph G = (V; E), written G n , is defined to be the graph having V as ...
We prove a conjecture of Dvořák, Král, Nejedlý, and Škrekovski that planar graphs of girth at l...
AbstractA graph is pseudo-median if for every triple u, v, w of vertices there exists either a uniqu...