A Distributed Observer for a Time-Invariant Linear System

TL;DR

This paper introduces a distributed observer design for linear systems that allows multiple agents to estimate the system state collaboratively using local measurements and neighbor communications, with spectrum assignment capabilities.

Contribution

It presents a novel distributed observer architecture for linear systems with spectrum assignment, based on classical decentralized control theory.

Findings

The observer ensures accurate state estimation under specified conditions.

Spectrum of the distributed observer can be freely assigned.

The approach requires the neighbor graph to be strongly connected.

Abstract

A time-invariant, linear, distributed observer is described for estimating the state of an $m>0$ channel, $n$-dimensional continuous-time linear system of the form $ \dot{x} = Ax,\ y_i = C_i x,\ i \in \{1,2,\cdots, m\}$. The state $x$ is simultaneously estimated by $m$ agents assuming each agent $i$ senses $y_i$ and receives the state $z_j$ of each of its neighbors' estimators. Neighbor relations are characterized by a constant directed graph $\mathbb{N}$ whose vertices correspond to agents and whose arcs depict neighbor relations. The overall distributed observer consists of $m$ linear estimators, one for each agent; $m-1$ of the estimators are of dimension $n$ and one estimator is of dimension $n+m-1$. Using results from classical decentralized control theory, it is shown that subject to the assumptions that (i) none of the $C_i$ are zero, (ii) the neighbor graph $\mathbb{N}$ is strongly connected, (iii) the system whose state is to be estimated is jointly observable, and nothing more, it is possible to freely assign the spectrum of the overall distributed observer.