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 describe the first parallel algorithm with optimal speedup for constructing minimum-width tree de...
In this paper, we study weak β-proximity drawings. All known algorithms that compute (weak)...
We study the width requirements of LR-drawings of n-node ordered rooted binary trees; these are the ...
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...
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-...
[[abstract]]In this paper two cost-optimal parallel algorithms are presented for constructing a B-tr...
We present an optimal parallel algorithm for the construction of(a, b)-trees-a generalization of 2-3...
AbstractThe goal of this paper is to investigate the area requirements for upward grid drawings of b...
We present several simple methods to construct planar, strictly upward, strongly order-preserving, s...
A parallel algorithm is given which constructs an optimal alphabetic tree in O(log³ n) time with n² ...
We describe the first parallel algorithm with optimal speedup for constructing minimum-width tree de...
In this paper, we study weak β-proximity drawings. All known algorithms that compute (weak)...
We study the width requirements of LR-drawings of n-node ordered rooted binary trees; these are the ...
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...
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-...
[[abstract]]In this paper two cost-optimal parallel algorithms are presented for constructing a B-tr...
We present an optimal parallel algorithm for the construction of(a, b)-trees-a generalization of 2-3...
AbstractThe goal of this paper is to investigate the area requirements for upward grid drawings of b...
We present several simple methods to construct planar, strictly upward, strongly order-preserving, s...
A parallel algorithm is given which constructs an optimal alphabetic tree in O(log³ n) time with n² ...
We describe the first parallel algorithm with optimal speedup for constructing minimum-width tree de...
In this paper, we study weak β-proximity drawings. All known algorithms that compute (weak)...
We study the width requirements of LR-drawings of n-node ordered rooted binary trees; these are the ...