Inverse problems for the heat equation with memory

Sergei A. Avdonin; Sergei A. Ivanov; Jun Min Wang

doi:10.3934/ipi.2019002

Inverse problems for the heat equation with memory

Sergei A. Avdonin, Sergei A. Ivanov, Jun Min Wang

School of Mathematics and Statistics

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

15 Citations (Scopus)

Abstract

We study inverse boundary problems for one dimensional linear integro-differential equation of the Gurtin-Pipkin type with the Dirichlet-to-Neumann map as the inverse data. Under natural conditions on the kernel of the integral operator, we give the explicit formula for the solution of the problem with the observation on the semiaxis t > 0: For the observation on finite time interval, we prove the uniqueness result, which is similar to the local Borg-Marchenko theorem for the Schrödinger equation.

Original language	English
Pages (from-to)	31-38
Number of pages	8
Journal	Inverse Problems and Imaging
Volume	13
Issue number	1
DOIs	https://doi.org/10.3934/ipi.2019002
Publication status	Published - 2019

Keywords

Borg-Marchenko theorem
Gurtin-pipkin equation
Inverse problem

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10.3934/ipi.2019002

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abstract = "We study inverse boundary problems for one dimensional linear integro-differential equation of the Gurtin-Pipkin type with the Dirichlet-to-Neumann map as the inverse data. Under natural conditions on the kernel of the integral operator, we give the explicit formula for the solution of the problem with the observation on the semiaxis t > 0: For the observation on finite time interval, we prove the uniqueness result, which is similar to the local Borg-Marchenko theorem for the Schr{\"o}dinger equation.",

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AU - Wang, Jun Min

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AB - We study inverse boundary problems for one dimensional linear integro-differential equation of the Gurtin-Pipkin type with the Dirichlet-to-Neumann map as the inverse data. Under natural conditions on the kernel of the integral operator, we give the explicit formula for the solution of the problem with the observation on the semiaxis t > 0: For the observation on finite time interval, we prove the uniqueness result, which is similar to the local Borg-Marchenko theorem for the Schrödinger equation.

KW - Borg-Marchenko theorem

KW - Gurtin-pipkin equation

KW - Inverse problem

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JO - Inverse Problems and Imaging

JF - Inverse Problems and Imaging

IS - 1

ER -

Inverse problems for the heat equation with memory

Abstract

Keywords

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