Minimal driver sets on path and cycle graphs with arbitrary non-zero weights
Abstract
Let be a simple, undirected graph on the vertex set and let be the adjacency matrix of A non-empty subset of is called a driver set for if the system is controllable. In this paper we classify the minimal driver sets for the path and cycle graphs and for all values of and we determine which of those minimal driver sets render the system to be strongly structural controllable with respect to the family of all symmetric matrices satisfying Note that this new type of strong structural controllability requires all diagonal elements of the system matrix to be equal to zero so for example the Laplacian matrix is not included in the family. Keywords: System, graph, (structural) controllability, driver set. MSC: 05C50, 05C69, 93B05, 93B25
Cite
@article{arxiv.2107.02054,
title = {Minimal driver sets on path and cycle graphs with arbitrary non-zero weights},
author = {Johannes G. Maks},
journal= {arXiv preprint arXiv:2107.02054},
year = {2022}
}