In this paper we study two problems concerned with recovering memory kernels related to two sub-bodies $\Omega_1$ and $\Omega_2$ of an open thermal body $\Omega={\overline \Omega_1}\cup\Omega_2$ under the assumptions that $\overline\Omega_1\subset \Omega$ and $\overline\Omega_1$ is not accessible for the measurements. Additional measurements of temperature gradient or flux type are provided on $\partial \Omega$. In the first problem the memory kernel related to $\Omega_1$ is unknown and a single measurement is given. In the second problem both kernels are to be determined from two measurements on $\partial \Omega$. Making use of Laplace transforms, we prove the uniqueness for these identification problems in the infinite time interval $(0,\infty)$.
Recovering memory kernels in parabolic transmission problems in infinite time intervals: the non-accessible case / J. Janno, A. Lorenzi. - In: JOURNAL OF INVERSE AND ILL-POSED PROBLEMS. - ISSN 0928-0219. - 18:4(2010), pp. 433-465.
Recovering memory kernels in parabolic transmission problems in infinite time intervals: the non-accessible case
A. LorenziUltimo
2010
Abstract
In this paper we study two problems concerned with recovering memory kernels related to two sub-bodies $\Omega_1$ and $\Omega_2$ of an open thermal body $\Omega={\overline \Omega_1}\cup\Omega_2$ under the assumptions that $\overline\Omega_1\subset \Omega$ and $\overline\Omega_1$ is not accessible for the measurements. Additional measurements of temperature gradient or flux type are provided on $\partial \Omega$. In the first problem the memory kernel related to $\Omega_1$ is unknown and a single measurement is given. In the second problem both kernels are to be determined from two measurements on $\partial \Omega$. Making use of Laplace transforms, we prove the uniqueness for these identification problems in the infinite time interval $(0,\infty)$.
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