1999
DOI: 10.1088/0266-5611/15/1/010
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Reciprocity principle and crack identification

Abstract: In this paper we are concerned with the planar crack identification problem defined by a unique complete elastostatic overdetermined boundary datum. Based on the reciprocity gap principle, we give a direct process for locating the host plane and we establish a new constuctive identifiability result for 3D planar cracks.

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Cited by 93 publications
(117 citation statements)
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“…The asymptotic form of integral equation (12) as a → 0 is now sought. For this purpose, and following customary practice for such asymptotic analyses, scaled coordinatesξ are introduced so that…”
Section: Preliminariesmentioning
confidence: 99%
See 1 more Smart Citation
“…The asymptotic form of integral equation (12) as a → 0 is now sought. For this purpose, and following customary practice for such asymptotic analyses, scaled coordinatesξ are introduced so that…”
Section: Preliminariesmentioning
confidence: 99%
“…Non-iterative approaches relevant to elastodynamic crack identification notably include methods based on the concepts of linear sampling [22,27,46], reciprocity gap [12,14,21], or topological derivative, the latter being considered herein. Initially introduced in connection with structural topology optimization [31,51], the concept of topological derivative (TD) has, since then, also been applied as a convenient, computationally economical means for qualitative flaw identification, see e.g.…”
Section: Introductionmentioning
confidence: 99%
“…New topics in mechanical tomography have recently been the subjects of several works. For example, solutions to crack inverse problems in two and three dimensions are known in elasticity [Andrieux and Ben Abda 1992;Andrieux et al 1999;Bui et al 2005] and in viscoelasticity , in statics as well as in dynamics, under the assumption of small frequencies. In elastodynamics, solutions of inverse crack problems are obtained in [Bui et al 2005] where the solution to an earthquake Keywords: nonlinear inverse problem, inclusion geometry, antiplane problem.…”
Section: Introductionmentioning
confidence: 99%
“…In medecine, tomography techniques using mechanical loads such as antiplane shear loading on life tissue, considered as a viscoelastic medium, have been worked out for Kelvin-Voigt's viscoelasticity (Catheline et al [12], Muller et al [18]) and for pure elasticity. In the elastic case, solutions to crack inverse problems in 2D and 3D are already known, see Andrieux and Ben Abda [4], Andrieux et al [5], Bui et al [8]. It is thus important to know if viscoelastic inverse problems can be studied by using classical correspondence between viscoelasticity and elasticity.…”
Section: Introductionmentioning
confidence: 99%