An edge dislocation interacting with a hypotrochoidal compressible liquid inclusion. (English) Zbl 1540.74016
Summary: We use Muskhelishvili’s complex variable formulation to derive a closed-form solution to the plane strain problem of a hypotrochoidal compressible liquid inclusion embedded in an infinite isotropic elastic matrix subjected to an edge dislocation located at an arbitrary position. The internal uniform hydrostatic tension within the hypotrochoidal liquid inclusion and all the unknown complex constants appearing in the two analytic functions characterizing the elastic field in the matrix are completely determined in an analytical manner. In principle, the solution to the problem of an edge dislocation interacting with an arbitrarily shaped compressible liquid inclusion can be obtained in closed-form as long as the adopted conformal mapping function which maps the exterior of the inclusion onto the exterior of the unit circle in the image plane contains a finite number of terms.
MSC:
| 74B05 | Classical linear elasticity |
| 74F10 | Fluid-solid interactions (including aero- and hydro-elasticity, porosity, etc.) |
| 74S70 | Complex-variable methods applied to problems in solid mechanics |
| 74G05 | Explicit solutions of equilibrium problems in solid mechanics |
Keywords:
Muskhelishvili complex variable method; closed-form solution; plane strain; infinite elastic matrix; uniform hydrostatic tensionReferences:
| [1] | Style, RW; Boltyanskiy, R.; Allen, B.; Jensen, KE; Foote, HP; Wettlaufer, JS; Dufresne, ER, Stiffening solids with liquid inclusions, Nat. Phys., 11, 1, 82-87, 2015 · doi:10.1038/nphys3181 |
| [2] | Ghosh, K.; Lopez-Pamies, O., Elastomers filled with liquid inclusions: theory, numerical implementation, and some basic results, J. Mech. Phys. Solids, 166, 2022 · doi:10.1016/j.jmps.2022.104930 |
| [3] | Ghosh, K.; Lefevre, V.; Lopez-Pamies, O., The effective shear modulus of a random isotropic suspension of monodisperse liquid n-spheres: from the dilute limit to the percolation threshold, Soft Matter, 19, 208-224, 2023 · doi:10.1039/D2SM01219G |
| [4] | Style, RW; Wettlaufer, JS; Dufresne, ER, Surface tension and the mechanics of liquid inclusions in compliant solids, Soft Matter, 11, 4, 672-679, 2015 · doi:10.1039/C4SM02413C |
| [5] | Wu, J.; Ru, CQ; Zhang, L., An elliptical liquid inclusion in an infinite elastic plane, Proc. Royal Soc. A, 474, 2215, 20170813, 2018 · doi:10.1098/rspa.2017.0813 |
| [6] | Chen, X.; Li, MX; Yang, M.; Liu, SB; Genin, GM; Xu, F.; Lu, TJ, The elastic fields of a compressible liquid inclusion, Extreme Mech. Lett., 22, 122-130, 2018 · doi:10.1016/j.eml.2018.06.002 |
| [7] | Dai, M.; Hua, J.; Schiavone, P., Compressible liquid/gas inclusion with high initial pressure in plane deformation: modified boundary conditions and related analytical solutions, Euro. J. Mech. A-Solids, 82, 2020 · Zbl 1475.74019 · doi:10.1016/j.euromechsol.2020.104000 |
| [8] | Dai, M.; Schiavone, P., Modified closed-form solutions for three-dimensional elastic deformations of a composite structure containing macro-scale spherical gas/liquid inclusions, Appl. Math. Model., 97, 57-68, 2021 · Zbl 1481.74122 · doi:10.1016/j.apm.2021.03.046 |
| [9] | Ti, F.; Chen, X.; Li, MX; Sun, XC; Liu, SB; Lu, TJ, Cylindrical compressible liquid inclusion with surface effects, J. Mech. Phys. Solids, 161, 2022 · doi:10.1016/j.jmps.2022.104813 |
| [10] | Ghosh, K.; Lefevre, V.; Lopez-Pamies, O., Homogenization of elastomers filled with liquid inclusions: the small-deformation limit, J. Elasticity, 154, 235-253, 2023 · Zbl 1530.74063 · doi:10.1007/s10659-023-09992-x |
| [11] | Wang, X.; Schiavone, P., Interaction between an edge dislocation and a circular incompressible liquid inclusion, Math. Mech. Solids, 29, 3, 531-538, 2024 · doi:10.1177/10812865231202445 |
| [12] | Wang, X.; Schiavone, P., An edge dislocation interacting with an elliptical incompressible liquid inclusion, J. Mech. Mater. Struct., 19, 1, 131-140, 2024 · doi:10.2140/jomms.2024.19.131 |
| [13] | Muskhelishvili, NI, Some Basic Problems of the Mathematical Theory of Elasticity, 1953, Groningen: P. Noordhoff Ltd., Groningen · Zbl 0052.41402 |
| [14] | England, AH, Complex variable method in elasticity, 1971, New York: Wiley, New York · Zbl 0222.73017 |
| [15] | Ting, TCT, Anisotropic elasticity: theory and applications, 1996, New York: Oxford University Press, New York · Zbl 0883.73001 · doi:10.1093/oso/9780195074475.001.0001 |
| [16] | Dundurs, J.: Elastic interaction of dislocations with inhomogeneities. In: Mathematical Theory of Dislocations (ed. T. Mura), pp. 70−115, American Society of Mechanical Engineers, New York (1969). · Zbl 0208.27503 |
This reference list is based on information provided by the publisher or from digital mathematics libraries. Its items are heuristically matched to zbMATH identifiers and may contain data conversion errors. In some cases that data have been complemented/enhanced by data from zbMATH Open. This attempts to reflect the references listed in the original paper as accurately as possible without claiming completeness or a perfect matching.
