Uniqueness and stability of parameter identification in elliptic boundary value problem

Main Article Content

Abir Benyoucef
Leila Alem
Lahcène Chorfi

Abstract

This paper concerns the uniqueness and stability of an inverse problem
in PDE. Our problem consists of identifying two parameters b(x)b(x) and c(x)c(x) in the following boundary-value problem


{Lu:=−b(x)u′′(x)+c(x)u′(x)=f(x),u(0)=u(1)=0,{Lu:=−b(x)u″(x)+c(x)u′(x)=f(x),u(0)=u(1)=0,


from distributed observations u1u1 (resp. u2u2) associated with the source f1f1 (resp. f2f2). For one observation, the solution is not unique. However, we prove, under some conditions, the uniqueness of the solution p=(b,c)p=(b,c) in the case of two observations. Furthermore, we derive a H\"older-type stability result. The algorithm of reconstruction uses the least squares method. Finally, we present some numerical examples with exact and noisy data to illustrate our method.

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How to Cite
[1]
Benyoucef, A. et al. 2022. Uniqueness and stability of parameter identification in elliptic boundary value problem. Journal of Innovative Applied Mathematics and Computational Sciences. 2, 2 (Aug. 2022), 30–37. DOI:https://doi.org/10.58205/jiamcs.v2i2.31.
Section
Conference paper (ICMA'2021)

References

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J. Zou, Numerical methods for elliptic inverse problems, Int. J. Comput. Math., 70(2) (1998), 211-232

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