Abstract. We study theMax k-colored clustering problem, where, given an edge-colored graph with k colors, we seek to color the vertices of the graph so as to find a clustering of the vertices maximizing the number (or the weight) of matched edges, i.e. the edges having the same color as their extremities. We show that the cardinality problem is NP-hard even for edge-colored bipartite graphs with a chromatic degree equal to two and k ≥ 3. Our main result is a constant approximation algorithm for the weighted version of the Max k-colored clustering problem which is based on a rounding of a natural linear programming relaxation. For graphs with chromatic degree equal to two, we improve this ratio by exploiting the relation of our problem with ...
We consider the problem of deciding whether a given directed graph can be vertex partitioned into tw...
We consider the problem of deciding whether a given directed graph can be vertex partitioned into tw...
In a bounded max-coloring of a vertex/edge weighted graph, each color class is of cardinality at mos...
International audienceWe study the Max k-colored clustering problem, where, given an edge-colored gr...
International audienceWe study the Max kk-colored clustering problem, where given an edge-colored gr...
We study a novel clustering problem in which the pairwise relations between objects are categorical....
We study a novel clustering problem in which the pairwise relations between objects are categorical....
Abstract. In this paper, we study a new type of clustering problem, called Chromatic Clustering, in ...
We study the following generalization of the classical edge coloring problem: Given a weighted graph...
We study the following generalization of the classical edge coloring problem: Given a weighted graph...
We present algorithms for three geometric problems -- clustering, orienteering, and conflict-free co...
Network models allow one to deal with massive data sets using some standard concepts from graph theo...
This paper surveys how geometric information can be effectively used for efficient algorithms with f...
International audienceIn this paper we study the problem of finding a maximum colorful clique in ver...
We consider the following general graph clustering problem: given a complete undirected graph G=(V,E...
We consider the problem of deciding whether a given directed graph can be vertex partitioned into tw...
We consider the problem of deciding whether a given directed graph can be vertex partitioned into tw...
In a bounded max-coloring of a vertex/edge weighted graph, each color class is of cardinality at mos...
International audienceWe study the Max k-colored clustering problem, where, given an edge-colored gr...
International audienceWe study the Max kk-colored clustering problem, where given an edge-colored gr...
We study a novel clustering problem in which the pairwise relations between objects are categorical....
We study a novel clustering problem in which the pairwise relations between objects are categorical....
Abstract. In this paper, we study a new type of clustering problem, called Chromatic Clustering, in ...
We study the following generalization of the classical edge coloring problem: Given a weighted graph...
We study the following generalization of the classical edge coloring problem: Given a weighted graph...
We present algorithms for three geometric problems -- clustering, orienteering, and conflict-free co...
Network models allow one to deal with massive data sets using some standard concepts from graph theo...
This paper surveys how geometric information can be effectively used for efficient algorithms with f...
International audienceIn this paper we study the problem of finding a maximum colorful clique in ver...
We consider the following general graph clustering problem: given a complete undirected graph G=(V,E...
We consider the problem of deciding whether a given directed graph can be vertex partitioned into tw...
We consider the problem of deciding whether a given directed graph can be vertex partitioned into tw...
In a bounded max-coloring of a vertex/edge weighted graph, each color class is of cardinality at mos...