A spectral method for numerical elastodynamic fracture analysis without spatial replication of the rupture event

Cochard, Alain; Rice, James R.

doi:10.1016/s0022-5096(97)00004-5

Cited by 45 publications

(39 citation statements)

References 15 publications

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“…More recent modelling works, based on the displacement discontinuity method, the regularization technique and the time-domain representation, dealt with the at two-dimensional (2-D) anti-plane crack [3; 4], at 3-D crack [5][6][7], non-planar 2-D anti-plane and=or in-plane cracks [8][9][10][11][12][13], and the non-planar 3-D crack [14][15][16]. Meanwhile, an alternative formulation, based on a Fourier transform in space, was also developed [17][18][19].…”

Section: Introductionmentioning

confidence: 99%

Dynamic modelling of the flat 2-D crack by a semi-analytic BIEM scheme

Tada

Madariaga

2000

Int. J. Numer. Meth. Engng.

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Section: Introductionmentioning

confidence: 99%

Dynamic modelling of the flat 2-D crack by a semi-analytic BIEM scheme

Tada

Madariaga

2000

Int. J. Numer. Meth. Engng.

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“…Geubelle and Rice [30] and Cochard and Rice [31] developed a formulation based on a Fourier representation in spatial coordinates along a fracture plane of the tractions and relative displacements. Legendre polynomials were introduced by Woo and Lee [32] yielding a p-FEM implementation, while Rahulkumar et al [33] developed a p-version of the singular quarter-point element.…”

Section: Introductionmentioning

confidence: 99%

A coupled FEM–Bernstein approach for computing the J k integrals

Garijo¹,

Gómez-Escalonilla

Valencia

2014

Arch Appl Mech

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The stress intensity factors of mixed mode I-II crack loading are often evaluated numerically via FEM implementation combined with the equivalent domain integral method to derive the J k integrals. Mesh refinement or singular elements are classic techniques for reproducing the sharp stress gradient due to material fracture. In this context, high-order Bernstein shape functions are proposed for a model that couples a radial spectral expansion for the stress field around crack tip with a finite element mesh in the outer regions. Lagrange multipliers are used to enforce the coupling in displacements along the FEM-Bernstein approximations interface, in which non-matching nodal patterns are allowed.

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“…In simple cases listed above, some forward models in infinite elastic medium can give good prediction of the acceleration signals to be compared to measurements [Campillo 1983;Cochard and Rice 1997;Vallée 2003;Peyrat et al 2004;Lapusta et al 2001]. True inverse problems are divided into two kinds.…”

Section: Introductionmentioning

confidence: 99%

The inverse problem of seismic fault determination using part time measurements

Bui

Constantinescu

Maigre

2012

J. Mech. Mater. Struct.

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This paper shows how a part time measurement T of the acceleration on the ground can be done to avoid the consideration of reflections of seismic waves on the Moho discontinuity. A bounded hemispherical solid is considered with radius greater than c p T , but smaller than the Moho depth, in order to get the null boundary conditions on the hemispherical surface. The inverse problem to determine the fault plane and the time-dependent fault geometry is well-defined and solved in closed form by the reciprocity gap functional method. Two formulae are established for the components of the fault slip, which involve time and spatial Fourier transforms of some quantities related to the reciprocity gap functional. A forward initial boundary value problem in elastodynamics enables us to get the internal wave field, the shear stress as well as the normal stress on the fault. This full solution would be useful for understanding the friction mechanism on the fault during a real strike, whenever the initial uniform tectonic stresses are known from geophysical considerations.

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A spectral method for numerical elastodynamic fracture analysis without spatial replication of the rupture event

Cited by 45 publications

References 15 publications

Dynamic modelling of the flat 2-D crack by a semi-analytic BIEM scheme

Dynamic modelling of the flat 2-D crack by a semi-analytic BIEM scheme

A coupled FEM–Bernstein approach for computing the J k integrals

The inverse problem of seismic fault determination using part time measurements

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