ALTERNATING MINIMIZATION FOR SIMULTANEOUS ESTIMATION OF A LATENT VARIABLE AND IDENTIFICATION OF A LINEAR CONTINUOUS-TIME DYNAMIC SYSTEM

Pierre Cyril Aubin-Frankowski; Alain Bensoussan; S. Joe Qin

doi:10.23952/cot.2023.34

ALTERNATING MINIMIZATION FOR SIMULTANEOUS ESTIMATION OF A LATENT VARIABLE AND IDENTIFICATION OF A LINEAR CONTINUOUS-TIME DYNAMIC SYSTEM

Pierre Cyril Aubin-Frankowski
, Alain Bensoussan
, S. Joe Qin

DI
University of Texas
Lingnan University, Hong Kong

Research output: Contribution to journal › Article › peer-review

Abstract

We propose an optimization formulation for the simultaneous estimation of a latent variable and the identification of a linear continuous-time dynamic system, given a single input-output pair. We justify this approach based on Bayesian maximum a posteriori estimators. Our scheme takes the form of a convex alternating minimization, over the trajectories and the dynamic model respectively. We prove its convergence to a local minimum which verifies a two point-boundary problem for the (latent) state variable and a tensor product expression for the optimal dynamics.

Original language	English
Article number	34
Journal	Communications in Optimization Theory
Volume	2023
DOIs	https://doi.org/10.23952/cot.2023.34
Publication status	Published - 1 Jan 2023
Externally published	Yes

Keywords

Alternating minimization
Continuous-time linear dynamic system
Latent variable
System identification

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10.23952/cot.2023.34

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abstract = "We propose an optimization formulation for the simultaneous estimation of a latent variable and the identification of a linear continuous-time dynamic system, given a single input-output pair. We justify this approach based on Bayesian maximum a posteriori estimators. Our scheme takes the form of a convex alternating minimization, over the trajectories and the dynamic model respectively. We prove its convergence to a local minimum which verifies a two point-boundary problem for the (latent) state variable and a tensor product expression for the optimal dynamics.",

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AU - Qin, S. Joe

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AB - We propose an optimization formulation for the simultaneous estimation of a latent variable and the identification of a linear continuous-time dynamic system, given a single input-output pair. We justify this approach based on Bayesian maximum a posteriori estimators. Our scheme takes the form of a convex alternating minimization, over the trajectories and the dynamic model respectively. We prove its convergence to a local minimum which verifies a two point-boundary problem for the (latent) state variable and a tensor product expression for the optimal dynamics.

KW - Alternating minimization

KW - Continuous-time linear dynamic system

KW - Latent variable

KW - System identification

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ALTERNATING MINIMIZATION FOR SIMULTANEOUS ESTIMATION OF A LATENT VARIABLE AND IDENTIFICATION OF A LINEAR CONTINUOUS-TIME DYNAMIC SYSTEM

Abstract

Keywords

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