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A Tutorial on the Non-Asymptotic Theory of System Identification

Ingvar Ziemann, Anastasios Tsiamis, Bruce P. Lee, Yassir Jedra, Nikolai Matni, George J. Pappas

202320 citationsDOI

Abstract

This tutorial serves as an introduction to recently developed non-asymptotic methods in the theory of-mainly linear-system identification. We emphasize tools we deem particularly useful for a range of problems in this domain, such as the covering technique, the Hanson-Wright Inequality and the method of self-normalized martingales. We then employ these tools to give streamlined proofs of the performance of various least-squares based estimators for identifying the parameters in autoregressive models. We conclude by sketching out how the ideas presented herein can be extended to certain nonlinear identification problems. Note: For reasons of space, proofs have been omitted in this version and are available in an online version: https://arxiv.org/abs/2309.03873.

Topics & Concepts

Mathematical proofIdentification (biology)Computer scienceEstimatorAutoregressive modelSystem identificationRange (aeronautics)Asymptotic analysisTheoretical computer scienceApplied mathematicsCalculus (dental)AlgorithmDomain (mathematical analysis)WrightAlgebra over a fieldMathematicsProgramming languageData modelingEconometricsPure mathematicsStatisticsSoftware engineeringGeometryBiologyBotanyMaterials scienceMathematical analysisComposite materialDentistryMedicineControl Systems and IdentificationGaussian Processes and Bayesian InferenceModel Reduction and Neural Networks
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