AbstractA linear arrangement of an n-vertex graph is a one-to-one mapping of its vertices to the integers {1, …, n}. The bandwidth of a linear arrangement is the maximum difference between mapped values of adjacent vertices. The problem of finding a linear arrangement with smallest possible bandwidth is NP-hard. We present a randomized algorithm that runs in nearly linear time and outputs a linear arrangement whose bandwidth is within a polylogarithmic multiplicative factor of optimal. Our algorithm is based on a new notion, called volume respecting embeddings, which is a natural extension of small distortion embeddings of Bourgain and of Linial, London and Rabinovich
AbstractWe give a polynomial time algorithm to compute the bandwidth of a (q,q−4)-graph for each con...
We design an algorithm to embed graph metrics into `p with dimension and distortion both dependent o...
The bandwidth problem seeks for a simultaneous permutation of the rows and columns of the adjacency ...
A linear arrangement of an n-vertex graph G = (V;E) is a one-one mapping f of the vertex set V onto ...
Finding a linear layout of a graph having minimum bandwidth is a combinatorial optimization problem ...
Introduction Given an undirected graph G = (V; E) on n vertices, a linear arrangement (also called ...
AbstractAn assignment of unique integers to the vertices of a graph is called a linear layout. The b...
AbstractWe give the first polynomial-time algorithm that computes the bandwidth of bipartite permuta...
AbstractWe present simple semi-definite programming relaxations for the NP-hard minimum bandwidth an...
The bandwidth of a n-vertex graph G is the smallest integer b such that there exists a bijective fun...
AbstractIn this paper we merge recent developments on exact algorithms for finding an ordering of ve...
The bandwidth problem is the problem of numbering the vertices of a given graph G such that the max...
. The bandwidth of a graph G is the minimum of the maximum difference between adjacent labels when t...
AbstractThe bandwidth of a graph G is the minimum of the maximum difference between adjacent labels ...
The bandwidth minimization problem is a classical combinatorial optimization problem studied since a...
AbstractWe give a polynomial time algorithm to compute the bandwidth of a (q,q−4)-graph for each con...
We design an algorithm to embed graph metrics into `p with dimension and distortion both dependent o...
The bandwidth problem seeks for a simultaneous permutation of the rows and columns of the adjacency ...
A linear arrangement of an n-vertex graph G = (V;E) is a one-one mapping f of the vertex set V onto ...
Finding a linear layout of a graph having minimum bandwidth is a combinatorial optimization problem ...
Introduction Given an undirected graph G = (V; E) on n vertices, a linear arrangement (also called ...
AbstractAn assignment of unique integers to the vertices of a graph is called a linear layout. The b...
AbstractWe give the first polynomial-time algorithm that computes the bandwidth of bipartite permuta...
AbstractWe present simple semi-definite programming relaxations for the NP-hard minimum bandwidth an...
The bandwidth of a n-vertex graph G is the smallest integer b such that there exists a bijective fun...
AbstractIn this paper we merge recent developments on exact algorithms for finding an ordering of ve...
The bandwidth problem is the problem of numbering the vertices of a given graph G such that the max...
. The bandwidth of a graph G is the minimum of the maximum difference between adjacent labels when t...
AbstractThe bandwidth of a graph G is the minimum of the maximum difference between adjacent labels ...
The bandwidth minimization problem is a classical combinatorial optimization problem studied since a...
AbstractWe give a polynomial time algorithm to compute the bandwidth of a (q,q−4)-graph for each con...
We design an algorithm to embed graph metrics into `p with dimension and distortion both dependent o...
The bandwidth problem seeks for a simultaneous permutation of the rows and columns of the adjacency ...