AbstractIn this paper we present a method to obtain optimal h-v drawings in parallel. Based on parallel tree contraction, our method computes optimal (with respect to a class of cost functions of the enclosing rectangle) drawings in O(log2n) parallel time by using a polynomial number of EREW processors. The number of processors reduces substantially when we study minimum area drawings. Our work places the problem of obtaining optimal size h-v drawings in NC, presenting the first algorithm with polylogarithmic time complexity
We present an optimal parallel algorithm for the construction of(a, b)-trees-a generalization of 2-3...
We study the width requirements of LR-drawings of n-node ordered rooted binary trees; these are the ...
We make progress on a number of open problems concerning the area requirement for drawing trees on a...
AbstractIn this paper we present a method to obtain optimal h-v drawings in parallel. Based on paral...
In this paper we present a method to obtain optimal h-v and inclusion drawings in parallel. Based on...
Abst ract. In this paper we present a method to obtain optimal h-v and inclusion drawings in paralle...
We study the area requirement of h-v drawings of complete binary trees. An h-v drawing of a binary t...
AbstractWe consider a problem of drawing a tree on parallel lines. In this problem we given a tree a...
We consider drawings of graphs in the plane in which vertices are assigned distinct points in the pl...
We present several simple methods to construct planar, strictly upward, strongly order-preserving, s...
AbstractThe goal of this paper is to investigate the area requirements for upward grid drawings of b...
AbstractWe investigate several straight-line drawing problems for bounded-degree trees in the intege...
In this paper we present a parallel algorithm that constructs an orthogonal drawing of an $n$ vertic...
In this paper we describe a parallel algorithm that, given an n vertex cubic graph G as input, outpu...
We present an optimal parallel algorithm for the construction of (a, b)-trees-a generalization of 2-...
We present an optimal parallel algorithm for the construction of(a, b)-trees-a generalization of 2-3...
We study the width requirements of LR-drawings of n-node ordered rooted binary trees; these are the ...
We make progress on a number of open problems concerning the area requirement for drawing trees on a...
AbstractIn this paper we present a method to obtain optimal h-v drawings in parallel. Based on paral...
In this paper we present a method to obtain optimal h-v and inclusion drawings in parallel. Based on...
Abst ract. In this paper we present a method to obtain optimal h-v and inclusion drawings in paralle...
We study the area requirement of h-v drawings of complete binary trees. An h-v drawing of a binary t...
AbstractWe consider a problem of drawing a tree on parallel lines. In this problem we given a tree a...
We consider drawings of graphs in the plane in which vertices are assigned distinct points in the pl...
We present several simple methods to construct planar, strictly upward, strongly order-preserving, s...
AbstractThe goal of this paper is to investigate the area requirements for upward grid drawings of b...
AbstractWe investigate several straight-line drawing problems for bounded-degree trees in the intege...
In this paper we present a parallel algorithm that constructs an orthogonal drawing of an $n$ vertic...
In this paper we describe a parallel algorithm that, given an n vertex cubic graph G as input, outpu...
We present an optimal parallel algorithm for the construction of (a, b)-trees-a generalization of 2-...
We present an optimal parallel algorithm for the construction of(a, b)-trees-a generalization of 2-3...
We study the width requirements of LR-drawings of n-node ordered rooted binary trees; these are the ...
We make progress on a number of open problems concerning the area requirement for drawing trees on a...