2008
DOI: 10.1002/pssb.200777712
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Fourth‐rank tensors of [[V2]2]‐type and elastic material constants for 2D crystals

Abstract: Fourth-rank tensors [[V 2 ] 2 ] (Voigt's) type, that embody the elastic properties of crystalline anisotropic substances, were constructed for all 2D crystal systems. Using them we obtained explicit expressions for inverse of Young's modulus E(n), inverse of shear modulus G(m, n) and Poisson's ratio ν(m, n), which depend on components of the elastic compliances tensor S, on direction cosines of vectors n of uniaxial load and the vector m of lateral strain with crystalline symmetry axes. All 2D crystal systems … Show more

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Cited by 8 publications
(13 citation statements)
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“…This yields the familiar inequalities (cf. 1, 9), namely: and where d depends on dimensionality D : $d = 2$ for 2D and $d = 3$ for 3D. We shall underline that the above inequalities hold only for initially unstrained crystals 9.…”
Section: The Stability Conditions For Cubic and Quadratic Materialsmentioning
confidence: 97%
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“…This yields the familiar inequalities (cf. 1, 9), namely: and where d depends on dimensionality D : $d = 2$ for 2D and $d = 3$ for 3D. We shall underline that the above inequalities hold only for initially unstrained crystals 9.…”
Section: The Stability Conditions For Cubic and Quadratic Materialsmentioning
confidence: 97%
“…They are related to the eigenvalues of the stiffness tensor C , namely $s_u = c_u^{ - 1} $ ($u = J,L,M$ ). For quadratic materials 1: …”
Section: Mechanical Characteristics Of Monocrystalline 3d and 2d Cumentioning
confidence: 99%
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“…Expressions for the PR of 2D materials are known, and the exact general formulas in terms of the compliances tensor S have been derived by Jasiukiewicz et al [25,26] with the fourth-rank symmetric tensorial bases, which are the counterparts of the tensor bases introduced by Walpole. For the square media from their approach, one can obtain the following expression (2)…”
Section: Directional Poisson's Ratiomentioning
confidence: 99%