Reconstruction of a linear crack in an isotropic elastic body from a single set of measured data

Ikehata, Masaru; Itou, Hiromichi

doi:10.1088/0266-5611/23/2/008

Cited by 20 publications

(28 citation statements)

References 21 publications

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“…In the case of homogeneous material which means ε = 0 the formula in Proposition 4.1 coincides with the form in [15], [26] and, furthermore, the condition (4.17) implies nonnegativity of Re[â 0 ], which corresponds to the results in [3], [22].…”

Section: Case 1 (Open Crack)mentioning

confidence: 71%

The interface crack with Coulomb friction between two bonded dissimilar elastic media

2011

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Section: Case 1 (Open Crack)mentioning

confidence: 71%

The interface crack with Coulomb friction between two bonded dissimilar elastic media

2011

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“…For example, any uniform pressure force field is well controlled. See [6] for other examples of well-controlled tractions which are independent of the unknown crack. Now we state our main result.…”

Section: Definitionmentioning

confidence: 99%

“…In the following steps we consider only the case when µ 1 = µ 2 and see [6,7] for the case when µ 1 = µ 2 .…”

Section: A Convergent Series Expansion Of the Displacement Field Nearmentioning

confidence: 99%

“…The aim of this expository paper is to report a recent application [6,7] of this method to an inverse problem for the crack in an elastic body in which the governing equation becomes an elliptic system. The problem is to extract information about the location and shape of an unknown crack from a single set of the surface displacement field and traction on the boundary of the elastic plate which is in the both of anisotropic and isotropic.…”

Section: Introductionmentioning

confidence: 99%

“…Under the condition (2.2) one knows the existence and uniqueness of u in a suitable function space. In [6,7] we considered the following problem and gave an answer by using the enclosure method.…”

Section: Introductionmentioning

confidence: 99%

See 2 more Smart Citations

Enclosure method and reconstruction of a linear crack in an elastic body

Ikehata

Itou

2008

J. Phys.: Conf. Ser.

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Abstract. In this paper we report a recent application of the idea of the enclosure method to an inverse problem related to a crack (inverse crack problem) in an elastic body. The problem is to extract information about the location and shape of an unknown crack from a single set of the surface displacement field and traction on the boundary of an arbitrary homogeneous elastic plate. Both anisotropic and isotropic bodies are considered. In states of both plane stress and plane strain, an extraction formula of an unknown crack is given provided: the crack is linear; one of two end points of the crack is known and located on the boundary of the body; a well-controlled surface traction is given on the boundary of the body.

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On inverse crack problems in elastostatics

Ikehata

Itou

2007

Proc Appl Math and Mech

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In solid mechanics, nondestructive testing has been an important technique in gathering information about unknown cracks, or defects in material. From a mathematical point of view, this is described as an inverse problem of partial differential equations, that is, the problem is to extract information about the location and shape of an unknown crack from the surface displacement field and traction on the boundary of the elastic material. By using the enclosure method introduced by Prof. Ikehata we can derive the extraction formula of an unknown linear crack from a single set of measured boundary data. Then, we need to have precise properties of a solution of the corresponding boundary value problem; for instance, an expansion formula around the crack tip. In this paper we consider the inverse problem concentrating on this point.Let Ω be a bounded convex domain in R 2 , representing a homogeneous linearized elastic plate. We denote by γ, which is the straight line segment P Q for any P ∈ ∂Ω and Q ∈ Ω the crack in Ω. Let Q be a point of intersection of an extension of the crack P Q and ∂Ω, γ denote P Q . Then, Ω is divided into two parts Ω + and Ω − by γ (See, Figure 1). By u = (u i ) i=1,2 and σ = (σ ij ) i,j=1,2 we denote the displacement vector and the stress tensor, respectively. Then, it is well known that σ has a singularity at the crack tip. In particular, coefficients of singular terms in an expansion of σ around the crack tip are important in fracture mechanics as stress intensity factors which are characterizing parameters of fracture.

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Reconstruction of a linear crack in an isotropic elastic body from a single set of measured data

Cited by 20 publications

References 21 publications

The interface crack with Coulomb friction between two bonded dissimilar elastic media

The interface crack with Coulomb friction between two bonded dissimilar elastic media

Enclosure method and reconstruction of a linear crack in an elastic body

On inverse crack problems in elastostatics

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