We derive a new lower bound for the bandwidth of a graph that is based on a new lower bound for the min-cut problem. Our new semidefinite programming relaxation of the min-cut problem is obtained by strengthening the known semidefinite programming relaxation for the quadratic assignment problem (or for the graph partition problem) by fixing two vertices in the graph; one on each side of the cut. Fixing results in several smaller subproblems that need to be solved to obtain the new bound. To efficiently solve these subproblems we exploit symmetry in the data; that is, both symmetry in the min-cut problem and symmetry in the graphs. To obtain upper bounds for the bandwidth of graphs with symmetry, we develop a heuristic approach based on the ...
AbstractIn this paper we merge recent developments on exact algorithms for finding an ordering of ve...
AbstractThe bandwidth of a graph G is the minimum of the maximum difference between adjacent labels ...
AbstractLet G be a finite undirected graph and let cw(G), s(G) and b(G) denote the cutwidth, search ...
We derive a new lower bound for the bandwidth of a graph that is based on a new lower bound for the ...
In this paper, we propose two new lower bounds on graph bandwidth and cyclic bandwidth based on semi...
The bandwidth problem seeks for a simultaneous permutation of the rows and columns of the adjacency ...
Introduction Given an undirected graph G = (V; E) on n vertices, a linear arrangement (also called ...
Finding a linear layout of a graph having minimum bandwidth is a combinatorial optimization problem ...
The graph bandwidth problem, where one looks for a labeling of graph vertices that gives the minimum...
AbstractThis paper presents strategies for improving the known upper and lower bounds for the bandwi...
This thesis presents a partial solution to the broad problem on bandwidths. The bandwidth problem f...
. The bandwidth of a graph G is the minimum of the maximum difference between adjacent labels when t...
AbstractFor a given graph G and vertices u, ν in G let Gmssu(u, ν), Ga(u, ν), Gs(u, ν), Gc(u,ν) deno...
The bandwidth problem deals with finding a labeling of a graph G using non-negative integers such th...
The bandwidth problem is the problem of numbering the vertices of a given graph G such that the max...
AbstractIn this paper we merge recent developments on exact algorithms for finding an ordering of ve...
AbstractThe bandwidth of a graph G is the minimum of the maximum difference between adjacent labels ...
AbstractLet G be a finite undirected graph and let cw(G), s(G) and b(G) denote the cutwidth, search ...
We derive a new lower bound for the bandwidth of a graph that is based on a new lower bound for the ...
In this paper, we propose two new lower bounds on graph bandwidth and cyclic bandwidth based on semi...
The bandwidth problem seeks for a simultaneous permutation of the rows and columns of the adjacency ...
Introduction Given an undirected graph G = (V; E) on n vertices, a linear arrangement (also called ...
Finding a linear layout of a graph having minimum bandwidth is a combinatorial optimization problem ...
The graph bandwidth problem, where one looks for a labeling of graph vertices that gives the minimum...
AbstractThis paper presents strategies for improving the known upper and lower bounds for the bandwi...
This thesis presents a partial solution to the broad problem on bandwidths. The bandwidth problem f...
. The bandwidth of a graph G is the minimum of the maximum difference between adjacent labels when t...
AbstractFor a given graph G and vertices u, ν in G let Gmssu(u, ν), Ga(u, ν), Gs(u, ν), Gc(u,ν) deno...
The bandwidth problem deals with finding a labeling of a graph G using non-negative integers such th...
The bandwidth problem is the problem of numbering the vertices of a given graph G such that the max...
AbstractIn this paper we merge recent developments on exact algorithms for finding an ordering of ve...
AbstractThe bandwidth of a graph G is the minimum of the maximum difference between adjacent labels ...
AbstractLet G be a finite undirected graph and let cw(G), s(G) and b(G) denote the cutwidth, search ...