Path-Based Conditions for Local Network Identifiability -- Full Version
Abstract
This work focuses on the generic identifiability of dynamical networks with partial excitation and measurement: a set of nodes are interconnected by transfer functions according to a known topology, some nodes are excited, some are measured, and only a part of the transfer functions are known. Our goal is to determine whether the unknown transfer functions can be generically recovered based on the input-output data collected from the excited and measured nodes. We propose a decoupled version of generic identifiability that is necessary for generic local identifiability and might be equivalent as no counter-example to sufficiency has been found yet in systematic trials. This new notion can be interpreted as the generic identifiability of a larger network, obtained by duplicating the graph, exciting one copy and measuring the other copy. We establish a necessary condition for decoupled identifiability in terms of vertex-disjoint paths in the larger graph, and a sufficient one.
Cite
@article{arxiv.2110.00126,
title = {Path-Based Conditions for Local Network Identifiability -- Full Version},
author = {Antoine Legat and Julien M. Hendrickx},
journal= {arXiv preprint arXiv:2110.00126},
year = {2021}
}
Comments
8 pages, 5 figures, full version with proofs of article to appear in IEEE Conference on Decision and Control 2021. arXiv admin note: text overlap with arXiv:2010.04538