NUMERICAL HOMOGENIZATION OF THE RIGIDITY TENSOR IN HOOKE'S LAW USING THE NODE-BASED FINITE ELEMENT METHOD

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dc.contributor.author Zijl W.
dc.contributor.author Hendriks M.A.N.
dc.contributor.author 't Hart C.M.P.
dc.date.accessioned 2021-04-16T05:17:17Z
dc.date.available 2021-04-16T05:17:17Z
dc.date.issued 2002
dc.identifier https://www.elibrary.ru/item.asp?id=951143
dc.identifier.citation Mathematical Geology, 2002, 34, 3, 291-322
dc.identifier.issn 0882-8121
dc.identifier.uri https://repository.geologyscience.ru/handle/123456789/27888
dc.description.abstract Combining a geological model with a geomechanical model, it generally turns out that the geomechanical model is built from units that are at least a 100 times larger in volume than the units of the geological model. To counter this mismatch in scales, the geological data model's heterogeneous fine-scale Young's moduli and Poisson's ratios have to be "upscaled" to one "equivalent homogeneous" coarse-scale rigidity. This coarse-scale rigidity relates the volume-averaged displacement, strain, stress, and energy to each other, in such a way that the equilibrium equation, Hooke's law, and the energy equation preserve their fine-scale form on the coarse scale. Under the simplifying assumption of spatial periodicity of the heterogeneous fine-scale rigidity, homogenization theory can be applied. However, even then the spatial variability is generally so complex that exact solutions cannot be found. Therefore, numerical approximation methods have to be applied. Here the node-based finite element method for the displacement as primary variable has been used. Three numerical examples showing the upper bound character of this finite element method are presented.
dc.subject PERIODIC MEDIA
dc.subject POISSON'S RATIO
dc.subject UPSCALING
dc.subject YOUNG'S MODULUS
dc.title NUMERICAL HOMOGENIZATION OF THE RIGIDITY TENSOR IN HOOKE'S LAW USING THE NODE-BASED FINITE ELEMENT METHOD
dc.type Статья


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