Efficient, Optimal $k$-Leader Selection for Coherent, One-Dimensional Formations
Abstract
We study the problem of optimal leader selection in consensus networks with noisy relative information. The objective is to identify the set of leaders that minimizes the formation's deviation from the desired trajectory established by the leaders. An optimal leader set can be found by an exhaustive search over all possible leader sets; however, this approach is not scalable to large networks. In recent years, several works have proposed approximation algorithms to the -leader selection problem, yet the question of whether there exists an efficient, non-combinatorial method to identify the optimal leader set remains open. This work takes a first step towards answering this question. We show that, in one-dimensional weighted graphs, namely path graphs and ring graphs, the -leader selection problem can be solved in polynomial time (in both and the network size ). We give an solution for optimal -leader selection in path graphs and an solution for optimal -leader selection in ring graphs.
Cite
@article{arxiv.1412.6595,
title = {Efficient, Optimal $k$-Leader Selection for Coherent, One-Dimensional Formations},
author = {Stacy Patterson and Neil McGlohon and Kirill Dyagilev},
journal= {arXiv preprint arXiv:1412.6595},
year = {2014}
}
Comments
7 pages, 5 figures, submitted to ECC15