Uniqueness to Some Inverse Source Problems for the Wave Equation in Unbounded Domains

Hu, Guanghui; Kian, Yavar; Zhao, Yue

doi:10.1007/s10255-020-0917-4

Cited by 21 publications

(13 citation statements)

References 40 publications

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“…Remark 3.1 The proof of Lemma 2.3 for α ∈ (1, 2) relies heavily on the analyticity of the solution in the time variable, which applies to the scalar wave equation (α = 2) when the dynamical measurement data over (0, ∞) are available; see [23,Theorem 2.1 and Corollary 2.3] where the data are measured on a closed surface. In Subsection 4.3 below, we shall present a proof for the wave equation using the data over a finite time period (0, T ).…”

Section: Preliminaries and Main Resultsmentioning

confidence: 99%

Inverse moving source problem for time-fractional evolution equations: Determination of profiles

Liu,

Hu,

Yamamoto

2020

Preprint

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This paper is concerned with the determination of moving source profile functions arising from time-fractional diffusion(-wave) equations, if the sources are supposed to move along given straight lines. If the time-fractional order satisfies 0 < α ≤ 1, we prove uniqueness in recovering a single moving source profile from suitably chosen volume observations over a finite time interval. If 1 < α ≤ 2, unique identification of two source profiles with distinct moving directions is verified.

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Section: Preliminaries and Main Resultsmentioning

confidence: 99%

Inverse moving source problem for time-fractional evolution equations: Determination of profiles

Liu,

Hu,

Yamamoto

2020

Preprint

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“…The above-cited articles are concerned with hyperbolic inverse source problems in a bounded spatial domain. Inverse source problems in an unbounded domain were studied in [3,10,11] and in [12], where the source term and an obstacle were retrieved. As for the recovery of initial data in the background of the TAT or PAT, we refer the reader to [2,9,29].…”

Section: Motivation and State Of The Artmentioning

confidence: 99%

“…where α 2 := 1+α1 2 and C 2 is a positive constant depending only on Ω, T , α and q. Indeed, since α and q lie in W 1,∞ (Ω), then it is clear from (12) that Q(t) ∈ B(H) for all t ∈ (0, T ]. Moreover, we have…”

Section: Improved Regularitymentioning

confidence: 99%

Determination of source and initial values for acoustic equations with a time-fractional attenuation

Huang¹,

Kian²,

Soccorsi³

et al. 2021

Preprint

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We consider the inverse problem of determining the initial states or the source term of a hyperbolic equation damped by some non-local time-fractional derivative. This framework is relevant to medical imaging such as thermoacoustic or photoacoustic tomography. We prove a stability estimate for each of these two problems, with the aid of a Carleman estimate specifically designed for the governing equation.

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“…Under a weak regularity assumption, a uniqueness result for a multidimensional hyperbolic inverse source problem with a single measurement was proved in [28]. Recently, an approach of using Laplace transform was employed in [12] to show the uniqueness of some inverse source problems for the wave equation.…”

Section: Introductionmentioning

confidence: 99%

The inverse source problem for the wave equation revisited: A new approach

Sini

Wang

2021

Preprint

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The inverse problem of reconstructing a source term from boundary measurements, for the wave equation, is revisited. We propose a novel approach to recover the unknown source through measuring the wave fields after injecting small particles, enjoying a high contrast, into the medium. For this purpose, we first derive the asymptotic expansion of the wave field, based on the time-domain Lippmann-Schwinger equation. The dominant term in the asymptotic expansion is expressed as an infinite series in terms of the eigenvalues {λ n } n∈N of the Newtonian operator (for the pure Laplacian). Such expansions are useful under a certain scale between the size of the particles and their contrast. Second, we observe that the relevant eigenvalues appearing in the expansion have non-zero averaged eigenfunctions. We prove that the family {sin( c1 √ λn t), cos( c1 √ λn t)}, for those relevant eigenvalues, with c 1 as the contrast of the small particle, defines a Riesz basis (contrary to the family corresponding to the whole sequence of eigenvalues). Then, using the Riesz theory, we reconstruct the wave field, generated before injecting the particles, on the center of the particles. Finally, from these (internal values of these) last fields, we reconstruct the source term (by numerical differentiation for instance). A significant advantage of our approach is that we only need the measurements on {x} × (0, T ) for a single point x away from Ω, i.e., the support of the source, and large enough T .

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Uniqueness to Some Inverse Source Problems for the Wave Equation in Unbounded Domains

Cited by 21 publications

References 40 publications

Inverse moving source problem for time-fractional evolution equations: Determination of profiles

Inverse moving source problem for time-fractional evolution equations: Determination of profiles

Determination of source and initial values for acoustic equations with a time-fractional attenuation

The inverse source problem for the wave equation revisited: A new approach

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