Numerical study of a parametric parabolic equation and a related inverse boundary value problem

We consider a time-dependent linear diffusion equation together with a related inverse boundary value problem. The aim of the inverse problem is to determine, based on observations on the boundary, the non-homogeneous diffusion coefficient in the interior of an object. The method in this paper relie...

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Veröffentlicht in:	arXiv.org 2016-07
1. Verfasser:	Mustonen, Lauri
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Sprache:	eng
Schlagworte:	Algorithms Boundary value problems Diffusion coefficient Forward problem Galerkin method Inverse problems Linearization Mathematics - Numerical Analysis Parameters Time dependence
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description	We consider a time-dependent linear diffusion equation together with a related inverse boundary value problem. The aim of the inverse problem is to determine, based on observations on the boundary, the non-homogeneous diffusion coefficient in the interior of an object. The method in this paper relies on solving the forward problem for a whole family of diffusivities by using a spectral Galerkin method in the high-dimensional parameter domain. The evaluation of the parametric solution and its derivatives is then completely independent of spatial and temporal discretizations. In case of a quadratic approximation for the parameter dependence and a direct solver for linear least squares problems, we show that the evaluation of the parametric solution does not increase the complexity of any linearized subproblem arising from a Gauss-Newtonian method that is used to minimize a Tikhonov functional. The feasibility of the proposed algorithm is demonstrated by diffusivity reconstructions in two and three spatial dimensions.
doi_str_mv	10.48550/arxiv.1506.01559
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subjects	Algorithms Boundary value problems Diffusion coefficient Forward problem Galerkin method Inverse problems Linearization Mathematics - Numerical Analysis Parameters Time dependence
title	Numerical study of a parametric parabolic equation and a related inverse boundary value problem
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