TL;DR
This paper investigates the observability of arrays of identical LTI systems with incommensurable output matrices, establishing a connection between observability and the connectivity of matrix-weighted interconnection graphs, and introduces pairwise observability analysis.
Contribution
It introduces a novel graph-theoretic framework for analyzing observability using matrix-weighted graphs and extends the concept to pairwise observability with circuit-theoretic tools.
Findings
Connectivity of the matrix-weighted graph characterizes system observability.
Pairwise observability relates to the nonsingularity of effective conductance.
The interconnection graph's connectivity is linked to eigenvalue-based graph analysis.
Abstract
Observability of an array of identical LTI systems with incommensurable output matrices is studied, where an array is called observable when identically zero relative outputs imply synchronized solutions for the individual systems. It is shown that the observability of an array is equivalent to the connectivity of its interconnection graph, whose edges are assigned matrix weights. The interconnection graph is studied by means of a collection of simpler graphs, each of which is associated to an eigenvalue of the system matrix of individual dynamics. It is reported that the interconnection graph is connected if and only if no member of this collection is disconnected. Moreover, to better understand the relative behavior of distant units, pairwise observability which concerns with the synchronization of a certain pair of individual systems in the array is studied. This milder version of…
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