PARALLEL SQUARE-ROOT STATISTICAL LINEAR REGRESSION FOR INFERENCE IN NONLINEAR STATE SPACE MODELS

Fatemeh Yaghoobi; Adrien Corenflos; Syeda Sakira Hassan; Simo Särkkä

doi:10.1137/23M156121X

PARALLEL SQUARE-ROOT STATISTICAL LINEAR REGRESSION FOR INFERENCE IN NONLINEAR STATE SPACE MODELS

Fatemeh Yaghoobi, Adrien Corenflos, Syeda Sakira Hassan, Simo Särkkä

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

Abstract

In this article, we first derive parallel square-root methods for state estimation in linear state-space models. We then extend the formulations to general nonlinear, non-Gaussian state-space models using statistical linear regression and iterated statistical posterior linearization paradigms. We finally leverage the fixed-point structure of our methods to derive parallel square-root likelihood-based parameter estimation methods. We demonstrate the practical performance of the methods by comparing the parallel and the sequential approaches on a set of numerical experiments.

Original language	English
Pages (from-to)	B454-B476
Number of pages	23
Journal	SIAM Journal on Scientific Computing
Volume	47
Issue number	2
DOIs	https://doi.org/10.1137/23M156121X
Publication status	Published - 2025
MoE publication type	A1 Journal article-refereed

Keywords

extended linearization
iterated Kalman smoothing
parallel scan
parameter estimation
robust inference
sigma-point

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10.1137/23M156121X

https://arxiv.org/abs/2207.00426Licence: CC BY

Cite this

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title = "PARALLEL SQUARE-ROOT STATISTICAL LINEAR REGRESSION FOR INFERENCE IN NONLINEAR STATE SPACE MODELS",

abstract = "In this article, we first derive parallel square-root methods for state estimation in linear state-space models. We then extend the formulations to general nonlinear, non-Gaussian state-space models using statistical linear regression and iterated statistical posterior linearization paradigms. We finally leverage the fixed-point structure of our methods to derive parallel square-root likelihood-based parameter estimation methods. We demonstrate the practical performance of the methods by comparing the parallel and the sequential approaches on a set of numerical experiments.",

keywords = "extended linearization, iterated Kalman smoothing, parallel scan, parameter estimation, robust inference, sigma-point",

author = "Fatemeh Yaghoobi and Adrien Corenflos and Hassan, {Syeda Sakira} and Simo S{\"a}rkk{\"a}",

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year = "2025",

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AU - Yaghoobi, Fatemeh

AU - Corenflos, Adrien

AU - Hassan, Syeda Sakira

AU - Särkkä, Simo

PY - 2025

Y1 - 2025

N2 - In this article, we first derive parallel square-root methods for state estimation in linear state-space models. We then extend the formulations to general nonlinear, non-Gaussian state-space models using statistical linear regression and iterated statistical posterior linearization paradigms. We finally leverage the fixed-point structure of our methods to derive parallel square-root likelihood-based parameter estimation methods. We demonstrate the practical performance of the methods by comparing the parallel and the sequential approaches on a set of numerical experiments.

AB - In this article, we first derive parallel square-root methods for state estimation in linear state-space models. We then extend the formulations to general nonlinear, non-Gaussian state-space models using statistical linear regression and iterated statistical posterior linearization paradigms. We finally leverage the fixed-point structure of our methods to derive parallel square-root likelihood-based parameter estimation methods. We demonstrate the practical performance of the methods by comparing the parallel and the sequential approaches on a set of numerical experiments.

KW - extended linearization

KW - iterated Kalman smoothing

KW - parallel scan

KW - parameter estimation

KW - robust inference

KW - sigma-point

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JF - SIAM Journal on Scientific Computing

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ER -

PARALLEL SQUARE-ROOT STATISTICAL LINEAR REGRESSION FOR INFERENCE IN NONLINEAR STATE SPACE MODELS

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Keywords

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Bayes-PIML: A Bayesian Paradigm for Physics-Informed Machine Learning

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PARALLEL SQUARE-ROOT STATISTICAL LINEAR REGRESSION FOR INFERENCE IN NONLINEAR STATE SPACE MODELS

Abstract

Keywords

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Bayes-PIML: A Bayesian Paradigm for Physics-Informed Machine Learning

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