Anisotropic Elastic Materials for which the Sextic Equation is a Cubic Equation in p2
From MaRDI portal
Publication:4528159
DOI10.1177/108128659800300101zbMath1001.74543OpenAlexW1968287157MaRDI QIDQ4528159
Publication date: 17 December 2002
Published in: Mathematics and Mechanics of Solids (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1177/108128659800300101
Cites Work
- Unnamed Item
- Effects of change of reference coordinates on the stress analyses of anisotropic elastic materials
- Barnett-Lothe tensors and their associated tensors for monoclinic materials with the symmetry plane at \(x_ 3=0\)
- The Galois unsolvability of the sextic equation of anisotropic elasticity
- New explicit expression of Barnett-Lothe tensors for anisotropic linear elastic materials
- ON THE IDENTIFICATION OF MATERIAL SYMMETRY FOR ANISOTROPIC ELASTIC MATERIALS
- Existence of an extraordinary degenerate matrix N for anisotropic elastic materials
- Dislocations and Cracks in Anisotropic Elasticity
- Steady State Problems in Anisotropic Elasticity
- Foundations of the Theory of Surface Waves in Anisotropic Elastic Materials
- The three-dimensional elastostatic Green's function for general anisotropic linear elastic solids
This page was built for publication: Anisotropic Elastic Materials for which the Sextic Equation is a Cubic Equation in p2
