Estimation of the Robin coefficient field in a Poisson problem with uncertain conductivity field*This work was partially supported by NSF grants ACI-1550547 and 1654311. (31st August 2018)
- Record Type:
- Journal Article
- Title:
- Estimation of the Robin coefficient field in a Poisson problem with uncertain conductivity field*This work was partially supported by NSF grants ACI-1550547 and 1654311. (31st August 2018)
- Main Title:
- Estimation of the Robin coefficient field in a Poisson problem with uncertain conductivity field*This work was partially supported by NSF grants ACI-1550547 and 1654311.
- Authors:
- Nicholson, Ruanui
Petra, Noémi
Kaipio, Jari P - Abstract:
- Abstract: We consider the reconstruction of a heterogeneous coefficient field in a Robin boundary condition on an inaccessible part of the boundary in a Poisson problem with an uncertain (or unknown) inhomogeneous conductivity field in the interior of the domain. To account for model errors that stem from the uncertainty in the conductivity coefficient, we treat the unknown conductivity as a nuisance parameter and carry out approximative premarginalization over it, and invert for the Robin coefficient field only. We approximate the related modelling errors via the Bayesian approximation error (BAE) approach. The uncertainty analysis presented here relies on a local linearization of the parameter-to-observable map at the maximum a posteriori (MAP) estimates, which leads to a normal (Gaussian) approximation of the parameter posterior density. To compute the MAP point we apply an inexact Newton conjugate gradient approach based on the adjoint methodology. The construction of the covariance is made tractable by invoking a low-rank approximation of the data misfit component of the Hessian. Two numerical experiments are considered: one where the prior covariance on the conductivity is isotropic, and one where the prior covariance on the conductivity is anisotropic. Results are compared to those based on standard error models, with particular emphasis on the feasibility of the posterior uncertainty estimates. We show that the BAE approach is a feasible one in the sense that theAbstract: We consider the reconstruction of a heterogeneous coefficient field in a Robin boundary condition on an inaccessible part of the boundary in a Poisson problem with an uncertain (or unknown) inhomogeneous conductivity field in the interior of the domain. To account for model errors that stem from the uncertainty in the conductivity coefficient, we treat the unknown conductivity as a nuisance parameter and carry out approximative premarginalization over it, and invert for the Robin coefficient field only. We approximate the related modelling errors via the Bayesian approximation error (BAE) approach. The uncertainty analysis presented here relies on a local linearization of the parameter-to-observable map at the maximum a posteriori (MAP) estimates, which leads to a normal (Gaussian) approximation of the parameter posterior density. To compute the MAP point we apply an inexact Newton conjugate gradient approach based on the adjoint methodology. The construction of the covariance is made tractable by invoking a low-rank approximation of the data misfit component of the Hessian. Two numerical experiments are considered: one where the prior covariance on the conductivity is isotropic, and one where the prior covariance on the conductivity is anisotropic. Results are compared to those based on standard error models, with particular emphasis on the feasibility of the posterior uncertainty estimates. We show that the BAE approach is a feasible one in the sense that the predicted posterior uncertainty is consistent with the actual estimation errors, while neglecting the related modelling error yields infeasible estimates for the Robin coefficient. In addition, we demonstrate that the BAE approach is approximately as computationally expensive (measured in the number of PDE solves) as the conventional error approach. … (more)
- Is Part Of:
- Inverse problems. Volume 34:Number 11(2018:Nov.)
- Journal:
- Inverse problems
- Issue:
- Volume 34:Number 11(2018:Nov.)
- Issue Display:
- Volume 34, Issue 11 (2018)
- Year:
- 2018
- Volume:
- 34
- Issue:
- 11
- Issue Sort Value:
- 2018-0034-0011-0000
- Page Start:
- Page End:
- Publication Date:
- 2018-08-31
- Subjects:
- estimation of Robin coefficient -- Modelling errors -- adjoint-based Hessian -- low rank approximation -- Bayesian approximation error approach -- approximate marginalization -- Bayesian framework
Inverse problems (Differential equations) -- Periodicals
515.357 - Journal URLs:
- http://iopscience.iop.org/0266-5611 ↗
http://ioppublishing.org/ ↗ - DOI:
- 10.1088/1361-6420/aad91e ↗
- Languages:
- English
- ISSNs:
- 0266-5611
- Deposit Type:
- Legaldeposit
- View Content:
- Available online (eLD content is only available in our Reading Rooms) ↗
- Physical Locations:
- British Library DSC - BLDSS-3PM
British Library STI - ELD Digital store - Ingest File:
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