Three-Dimensional Volume Integral Equation Method for Solving Isotropic/Anisotropic Inhomogeneity Problems
- Authors
- Lee, Jungki; Han, Mingu
- Issue Date
- Nov-2020
- Publisher
- MDPI
- Keywords
- numerical modelling; multiple isotropic; anisotropic inhomogeneities; three-dimensional volume integral equation method; finite element method; boundary integral equation method; elastostatics; elastodynamics
- Citation
- MATHEMATICS, v.8, no.11, pp.1 - 25
- Journal Title
- MATHEMATICS
- Volume
- 8
- Number
- 11
- Start Page
- 1
- End Page
- 25
- URI
- https://scholarworks.bwise.kr/hongik/handle/2020.sw.hongik/11476
- DOI
- 10.3390/math8111866
- ISSN
- 2227-7390
- Abstract
- In this paper, the volume integral equation method (VIEM) is introduced for the analysis of an unbounded isotropic solid composed of multiple isotropic/anisotropic inhomogeneities. A comprehensive examination of a three-dimensional elastostatic VIEM is introduced for the analysis of an unbounded isotropic solid composed of isotropic/anisotropic inhomogeneity of arbitrary shape. The authors hope that the volume integral equation method can be used to compute critical values of practical interest in realistic models of composites composed of strong anisotropic and/or heterogeneous inhomogeneities of arbitrary shapes.
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Collections - College of Science and Technology > Department of Mechanical and Design Engineering > 1. Journal Articles
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