In the Minimum Label Spanning Tree problem, the input consists of an edge-colored undirected graph, and the goal is to find a spanning tree with the minimum number of different colors. We investigate the special case where every color appears at most r times in the input graph. This special case is polynomially solvable for r=2, and NP- and APX-complete for any fixed rgreater-or-equal, slanted3. We analyze local search algorithms that are allowed to switch up to k of the colors used in a feasible solution. We show that for k=2 any local optimum yields an (r+1)/2-approximation of the global optimum, and that this bound is tight. For every kgreater-or-equal, slanted3, there exist instances for which some local optima are a factor of r/2 aw...
AbstractIn the k-labeled Spanning Forest Problem (kLSF), given a graph G with a label (color) assign...
In the k-labeled Spanning Forest Problem (kLSF), given a graph G with a label (color) assigned to ea...
This paper studies heuristics for the minimum labelling spanning tree (MLST) problem. The purpose is...
In the Minimum Label Spanning Tree problem, the input consists of an edge-colored undirected graph, ...
We consider a family of local search algorithms for the minimum-weight spanning tree, indexed by a p...
Given a connected, undirected graph whose edges are labelled (or coloured), the minimum labelling s...
Given an undirected graph whose edges are labeled or colored, edge weights indicating the cost of an...
Given a graph G = (V,E) and a (not necessarily proper) edge-coloring of G, we consider the complexit...
In this paper we propose some extensions of the minimum labelling spanning tree problem. The main fo...
Abstract — In this paper we propose some extensions of the minimum labelling spanning tree problem. ...
Given a connected, undirected graph G with labeled edges, the minimum-label spanning tree problem se...
We consider maximum properly edge-colored trees in edge-colored graphs Gc. We also consider the prob...
In this work we introduce and study the strong generalized minimum label spanning tree (GMLST), a no...
We present a study on heuristic solution approaches to the minimum labelling Steiner tree problem, a...
This report studies constructive heuristics for the minimum labelling spanning tree (MLST) problem....
AbstractIn the k-labeled Spanning Forest Problem (kLSF), given a graph G with a label (color) assign...
In the k-labeled Spanning Forest Problem (kLSF), given a graph G with a label (color) assigned to ea...
This paper studies heuristics for the minimum labelling spanning tree (MLST) problem. The purpose is...
In the Minimum Label Spanning Tree problem, the input consists of an edge-colored undirected graph, ...
We consider a family of local search algorithms for the minimum-weight spanning tree, indexed by a p...
Given a connected, undirected graph whose edges are labelled (or coloured), the minimum labelling s...
Given an undirected graph whose edges are labeled or colored, edge weights indicating the cost of an...
Given a graph G = (V,E) and a (not necessarily proper) edge-coloring of G, we consider the complexit...
In this paper we propose some extensions of the minimum labelling spanning tree problem. The main fo...
Abstract — In this paper we propose some extensions of the minimum labelling spanning tree problem. ...
Given a connected, undirected graph G with labeled edges, the minimum-label spanning tree problem se...
We consider maximum properly edge-colored trees in edge-colored graphs Gc. We also consider the prob...
In this work we introduce and study the strong generalized minimum label spanning tree (GMLST), a no...
We present a study on heuristic solution approaches to the minimum labelling Steiner tree problem, a...
This report studies constructive heuristics for the minimum labelling spanning tree (MLST) problem....
AbstractIn the k-labeled Spanning Forest Problem (kLSF), given a graph G with a label (color) assign...
In the k-labeled Spanning Forest Problem (kLSF), given a graph G with a label (color) assigned to ea...
This paper studies heuristics for the minimum labelling spanning tree (MLST) problem. The purpose is...