On the problem of a three-dimensional crack in an anisotropic elastic medium
From MaRDI portal
Publication:1166987
DOI10.1016/0021-8928(81)90045-9zbMath0489.73106OpenAlexW2019971558MaRDI QIDQ1166987
Publication date: 1981
Published in: Journal of Applied Mathematics and Mechanics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/0021-8928(81)90045-9
three-dimensional crackSomigliana dislocationclass of sufficiently smooth functionsdensity of dislocation momentshomogeneous and anisotropic mediumisolated crackreduced to solution of elliptic pseudo- differential equationregular representation of operator
Related Items
Stress fields in 3D-elastic material containing multiple interacting cracks of arbitrary shapes: efficient calculation ⋮ Hydraulic fracture crack propagation in an elastic medium with varying fracture toughness ⋮ Efficient numerical solution of the hydraulic fracture problem for planar cracks ⋮ Overall elastic properties of a material containing inhomogeneities of concave shape ⋮ An efficient homogenization method for elastic media with multiple cracks ⋮ A unified methodology for calculation of compliance and stiffness contribution tensors of inhomogeneities of arbitrary 2D and 3D shapes embedded in isotropic matrix -- open access software. ⋮ Scattering of monochromatic elastic waves on a planar crack of arbitrary shape ⋮ Hypersingular integrals in plane problems of the theory of elasticity ⋮ Preface ⋮ Crack edge element of three-dimensional displacement discontinuity method with boundary division into triangular leaf elements ⋮ Elliptical cracks arbitrarily oriented in 3D-anisotropic elastic media ⋮ Fast solution of the elasticity problem for a planar crack of arbitrary shape in 3D-anisotropic medium ⋮ Propagation of elastic waves through media with thin crack-like inclusions ⋮ Replacement relations for elastic composite materials having different matrices and related problems ⋮ On singular models of a thin inclusion in a homogeneous elastic medium ⋮ Correlation function of the stress field in an elastic medium with point defects ⋮ Integral equations for a thin inclusion in a homogeneous elastic medium
Cites Work
