Andrea Raiconi scite author profile

In the k-labeled Spanning Forest Problem (kLSF), given a graph G with a label (color) assigned to each edge, and an integer positive value kmax we look for the minimum number of connected components that can be obtained by using at most kmax different labels. The problem is strictly related to the Minimum Labelling Spanning Tree Problem (MLST), since a spanning tree of the graph (i.e. a single connected component) would obviously be an optimal solution for the kLSF, if it can be obtained without violating the bound on kmax. In this work we present heuristic and exact approaches to solve this new problem

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α-Coverage to extend network lifetime on wireless sensor networks

Gentili

Raiconi

2011

Optim Lett

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Minimum spanning tree with conflicting edge pairs: a branch-and-cut approach

et al. 2018

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Exact and Metaheuristic Approaches to Extend Lifetime and Maintain Connectivity in Wireless Sensors Networks

Raiconi

Gentili

2011

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Andrea Raiconi

Exact and heuristic methods to maximize network lifetime in wireless sensor networks with adjustable sensing ranges

The k-labeled Spanning Forest Problem

α-Coverage to extend network lifetime on wireless sensor networks

Minimum spanning tree with conflicting edge pairs: a branch-and-cut approach

Exact and Metaheuristic Approaches to Extend Lifetime and Maintain Connectivity in Wireless Sensors Networks

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