Add to ORKGWe study augmenting a plane Euclidean network with a segment, called shortcut, to minimize the largest distance between any two points along the edges of the resulting network. Questions of this type have received considerable attention recently, mostly for discrete variants of the problem. We study a fully continuous setting, where all points on the network and the inserted segment must be taken into account. We present the first results on the computation of optimal shortcuts for general networks in this model, together with several results for networks that are paths, restricted to two types of shortcuts: shortcuts with a fixed orientation and simple shortcuts.Ministerio de Economía y Competitividad MTM2015-63791-RMinisterio de Eco...
Given a Euclidean graph G in Rd with n vertices and m edges we consider the problem of adding a shor...
We consider the problem of finding a shortcut connecting two vertices of a graph that minimizes the ...
Let C be the unit circle in R 2 . We can view C as a plane graph whose vertices are all the points ...
We study augmenting a plane Euclidean network with a segment, called shortcut, to minimize the large...
We study augmenting a plane Euclidean network with a segment, called shortcut, to minimize the large...
We augment a plane Euclidean network with a segment or shortcut to minimize the largest distance bet...
We seek to augment a geometric network in the Euclidean plane with shortcuts to minimize its continu...
We study the problem of augmenting the locus N of a plane Euclidean network N by in- serting itera...
We study the problem of minimizing the diameter of a graph by adding k shortcut edges, for speeding ...
We augment a tree T with a shortcut pq to minimize the largest distance between any two points along...
We augment a tree T with a shortcut pq to minimize the largest distance between any two points along...
Abstract. Shortcutting is the operation of adding edges to a network with the intent to decrease its...
Shortcutting is the operation of adding edges to a network with the intent to decrease its diameter....
The small world phenomenon is a desirable property of social networks, since it guarantees short pat...
International audienceWe study a graph-augmentation problem arising from a technique applied in rece...
Given a Euclidean graph G in Rd with n vertices and m edges we consider the problem of adding a shor...
We consider the problem of finding a shortcut connecting two vertices of a graph that minimizes the ...
Let C be the unit circle in R 2 . We can view C as a plane graph whose vertices are all the points ...
We study augmenting a plane Euclidean network with a segment, called shortcut, to minimize the large...
We study augmenting a plane Euclidean network with a segment, called shortcut, to minimize the large...
We augment a plane Euclidean network with a segment or shortcut to minimize the largest distance bet...
We seek to augment a geometric network in the Euclidean plane with shortcuts to minimize its continu...
We study the problem of augmenting the locus N of a plane Euclidean network N by in- serting itera...
We study the problem of minimizing the diameter of a graph by adding k shortcut edges, for speeding ...
We augment a tree T with a shortcut pq to minimize the largest distance between any two points along...
We augment a tree T with a shortcut pq to minimize the largest distance between any two points along...
Abstract. Shortcutting is the operation of adding edges to a network with the intent to decrease its...
Shortcutting is the operation of adding edges to a network with the intent to decrease its diameter....
The small world phenomenon is a desirable property of social networks, since it guarantees short pat...
International audienceWe study a graph-augmentation problem arising from a technique applied in rece...
Given a Euclidean graph G in Rd with n vertices and m edges we consider the problem of adding a shor...
We consider the problem of finding a shortcut connecting two vertices of a graph that minimizes the ...
Let C be the unit circle in R 2 . We can view C as a plane graph whose vertices are all the points ...