Graphs and AlgorithmsWe show that there exist series-parallel graphs requiring Omega(n2(root log n)) area in any straight-line or poly-line grid drawing. Such a result is achieved in two steps. First, we show that, in any straight-line or poly-line drawing of K(2,n), one side of the bounding box has length Omega(n), thus answering two questions posed by Biedl et al. Second, we show a family of series-parallel graphs requiring Omega(2(root log n)) width and Omega(2(root log n)) height in any straight-line or poly-line grid drawing. Combining the two results, the Omega(n2(root log n)) area lower bound is achieved
We show that an outerplanar graph G with n vertices and degree d admits a planar straight-line grid ...
n+1 2 \Theta n+1 2 area and, if the graph is biconnected, at most b n 2 c + 3 bends. These upper bou...
We show three linear time algorithms for constructing planar straight-line grid drawings of outerpla...
We show that there exist series-parallel graphs requiring Ω(n2 logn) area in any straight-line or po...
In this paper, we study small planar drawings of planar graphs. For arbitrary planar graphs, Θ(n2 ) ...
One way to quantify how dense a multidag is in long paths is to find the largest n,m such that which...
Despite a long research effort, finding the minimum area for straight-line grid drawings of planar g...
We prove that every n-vertex graph G with path-width pw(G) has a three-dimensional straight-line gri...
We prove that every n-vertex graph G with path-width pw(G) has a three-dimensional straight-line gri...
The length of a tree-decomposition of a graph is the maximum distance between two vertices of a same...
International audienceThe length of a tree-decomposition of a graph is the maximum distance (in the ...
AbstractIt is important to minimize the area of a drawing of a graph, so that the drawing can fit in...
We study the number of vertices which must be removed from a graph in order to make it planar or ser...
A k-track drawing is a crossing-free 3D straight-line grid drawing of a graph G on a set of k parall...
AbstractThe goal of this paper is to investigate the area requirements for upward grid drawings of b...
We show that an outerplanar graph G with n vertices and degree d admits a planar straight-line grid ...
n+1 2 \Theta n+1 2 area and, if the graph is biconnected, at most b n 2 c + 3 bends. These upper bou...
We show three linear time algorithms for constructing planar straight-line grid drawings of outerpla...
We show that there exist series-parallel graphs requiring Ω(n2 logn) area in any straight-line or po...
In this paper, we study small planar drawings of planar graphs. For arbitrary planar graphs, Θ(n2 ) ...
One way to quantify how dense a multidag is in long paths is to find the largest n,m such that which...
Despite a long research effort, finding the minimum area for straight-line grid drawings of planar g...
We prove that every n-vertex graph G with path-width pw(G) has a three-dimensional straight-line gri...
We prove that every n-vertex graph G with path-width pw(G) has a three-dimensional straight-line gri...
The length of a tree-decomposition of a graph is the maximum distance between two vertices of a same...
International audienceThe length of a tree-decomposition of a graph is the maximum distance (in the ...
AbstractIt is important to minimize the area of a drawing of a graph, so that the drawing can fit in...
We study the number of vertices which must be removed from a graph in order to make it planar or ser...
A k-track drawing is a crossing-free 3D straight-line grid drawing of a graph G on a set of k parall...
AbstractThe goal of this paper is to investigate the area requirements for upward grid drawings of b...
We show that an outerplanar graph G with n vertices and degree d admits a planar straight-line grid ...
n+1 2 \Theta n+1 2 area and, if the graph is biconnected, at most b n 2 c + 3 bends. These upper bou...
We show three linear time algorithms for constructing planar straight-line grid drawings of outerpla...