Uniqueness in shape identification of a time-varying domain and related parabolic equations on non-cylindrical domains

Kawakami, Hajime; Tsuchiya, Masaaki

doi:10.1088/0266-5611/26/12/125007

Cited by 9 publications

(22 citation statements)

References 24 publications

(42 reference statements)

Supporting

Mentioning

Contrasting

Order By: Relevance

“…The authors in [3] proved uniqueness of D T under the assumption that the inclusion D(t) is x-lipchitzian for all t. They used a proof by contradiction and is not constructive at all. A more recent paper for a similar question is [11].…”

Section: Literature Reviewmentioning

confidence: 99%

Recovering time-dependent inclusion in heat-conductive bodies using a dynamical probe method

Poisson

2016

Journal of Mathematical Analysis and Applications

View full text Add to dashboard Cite

International audienceWe consider an inverse boundary value problem for the heat equation ∂tv = divx (γ∇xv) in (0, T) × Ω, where Ω is a bounded domain of R 3 , the heat conductivity γ(t, x) admits a surface of discontinuity which depends on time and without any spatial smoothness. The reconstruction and, implicitly, uniqueness of the moving inclusion, from the knowledge of the Dirichlet-to-Neumann operator, is realised by a dynamical probe method based on the construction of fundamental solutions of the elliptic operator −∆ + τ 2 ·, where τ is a large real parameter, and a couple of inequalities relating data and integrals on the inclusion, which are similar to the elliptic case. That these solutions depend not only on the pole of the fundamental solution, but on the large parameter τ also, allows the method to work in the very general situation

show abstract

Section: Literature Reviewmentioning

confidence: 99%

Recovering time-dependent inclusion in heat-conductive bodies using a dynamical probe method

Poisson

2016

Journal of Mathematical Analysis and Applications

View full text Add to dashboard Cite

show abstract

“…As for the recent works on the inverse problem for the parabolic equation, see Bacchelli-Cristo-Sincich-Vessella [2] for the corrosion problem, and Vessella [20] and Kawakami-Tsuchiya [14] for the time-varying domain problem.…”

Section: 3mentioning

confidence: 99%

Inverse Problems for Time-Dependent Singular Heat Conductivities: Multi-Dimensional Case

Gaitan

Isozaki

Poisson

et al. 2015

Communications in Partial Differential Equations

View full text Add to dashboard Cite

Abstract. We consider an inverse boundary value problem for the heat equation ∂tu = div (γ∇xu) in (0, T ) × Ω, u = f on (0, T ) × ∂Ω, u t=0 = u 0 , in a bounded domain Ω ⊂ R n , n ≥ 2, where the heat conductivity γ(t, x) is piecewise constant and the surface of discontinuity depends on time :. Fix a direction e * ∈ S n−1 arbitrarily. Assuming that ∂D(t) is strictly convex for 0 ≤ t ≤ T , we show that k and sup{e * ·x ; x ∈ D(t)} (0 ≤ t ≤ T ), in particular D(t) itself, are determined from the Dirichlet-to-Neumann map : f → ∂ν u(t, x) (0,T )×∂Ω . The knowledge of the initial data u 0 is not used in the proof. If we know min 0≤t≤T sup x∈D(t) x · e * , we have the same conclusion from the local Dirichlet-to-Neumann map. The results have applications to nondestructive testing. Consider a physical body consisiting of homogeneous material with constant heat conductivity except for a moving inclusion with different conductivity. Then the location and shape of the inclusion can be monitored from temperature and heat flux measurements performed at the boundary of the body. Such a situation appears for example in blast furnaces used in ironmaking.

show abstract

“…Their initial data is assumed to be zero: u 0 = 0, and the computation of k was not done. As for the recent works on the inverse problem for the parabolic equation, see Bacchelli et al [1] for the corrosion problem, Vessella [14] and Kawakami and Tsuchiya [11] for the time-varying domain problem.…”

Section: Inverse Heat Conductivity Problemmentioning

confidence: 99%

Inverse Problems for Time-Dependent Singular Heat Conductivities---One-Dimensional Case

Gaitan¹,

Isozaki²,

Poisson³

et al. 2013

SIAM J. Math. Anal.

View full text Add to dashboard Cite

International audienceWe consider an inverse boundary value problem for the heat equation on the interval (0, 1), where the heat conductivity γ(t, x) is piecewise constant and the point of discontinuity depends on time : γ(t, x) = k 2 (0 < x < s(t)), γ(t, x) = 1 (s(t) < x < 1). Firstly we show that k and s(t) on the time interval [0, T ] are determined from a partial Dirichlet-to-Neumann map : u(t, 1) → ∂xu(t, 1), 0 < t < T , u(t, x) being the solution to the heat equation such that u(t, 0) = 0, independently of the initial data u(0, x). Secondly we show that another partial Dirichlet-to-Neumann map u(t, 0) → ∂xu(t, 1), 0 < t < T , u(t, x) being the solution to the heat equation such that u(t, 1) = 0, restricts the pair (k, s(t)) to at most two cases on the time interval [0, T ], independently of the initial data u(0, x)

show abstract

Uniqueness in shape identification of a time-varying domain and related parabolic equations on non-cylindrical domains

Cited by 9 publications

References 24 publications

Recovering time-dependent inclusion in heat-conductive bodies using a dynamical probe method

Recovering time-dependent inclusion in heat-conductive bodies using a dynamical probe method

Inverse Problems for Time-Dependent Singular Heat Conductivities: Multi-Dimensional Case

Inverse Problems for Time-Dependent Singular Heat Conductivities---One-Dimensional Case

Contact Info

Product

Resources

About