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Main Authors: Chada, Neil K., Jasra, Ajay, Maama, Mohamed, Tempone, Raul
Format: Preprint
Published: 2025
Subjects:
Online Access:https://arxiv.org/abs/2502.03920
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author Chada, Neil K.
Jasra, Ajay
Maama, Mohamed
Tempone, Raul
author_facet Chada, Neil K.
Jasra, Ajay
Maama, Mohamed
Tempone, Raul
contents In this paper we consider the estimation of unknown parameters in Bayesian inverse problems. In most cases of practical interest, there are several barriers to performing such estimation, This includes a numerical approximation of a solution of a differential equation and, even if exact solutions are available, an analytical intractability of the marginal likelihood and its associated gradient, which is used for parameter estimation. The focus of this article is to deliver unbiased estimates of the unknown parameters, that is, stochastic estimators that, in expectation, are equal to the maximize of the marginal likelihood, and possess no numerical approximation error. Based upon the ideas of [4] we develop a new approach for unbiased parameter estimation for Bayesian inverse problems. We prove unbiasedness and establish numerically that the associated estimation procedure is faster than the current state-of-the-art methodology for this problem. We demonstrate the performance of our methodology on a range of problems which include a PDE and ODE.
format Preprint
id arxiv_https___arxiv_org_abs_2502_03920
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Unbiased Parameter Estimation for Bayesian Inverse Problems
Chada, Neil K.
Jasra, Ajay
Maama, Mohamed
Tempone, Raul
Methodology
In this paper we consider the estimation of unknown parameters in Bayesian inverse problems. In most cases of practical interest, there are several barriers to performing such estimation, This includes a numerical approximation of a solution of a differential equation and, even if exact solutions are available, an analytical intractability of the marginal likelihood and its associated gradient, which is used for parameter estimation. The focus of this article is to deliver unbiased estimates of the unknown parameters, that is, stochastic estimators that, in expectation, are equal to the maximize of the marginal likelihood, and possess no numerical approximation error. Based upon the ideas of [4] we develop a new approach for unbiased parameter estimation for Bayesian inverse problems. We prove unbiasedness and establish numerically that the associated estimation procedure is faster than the current state-of-the-art methodology for this problem. We demonstrate the performance of our methodology on a range of problems which include a PDE and ODE.
title Unbiased Parameter Estimation for Bayesian Inverse Problems
topic Methodology
url https://arxiv.org/abs/2502.03920