Irreducible representations for constitutive equations of anisotropic solids II: crystal and quasicrystal classes D 2m+1d , D 2m+1  and C 2m+1v

doi:10.24423/aom.3

Vol 52, No 1 (2000)

Irreducible representations for constitutive equations of anisotropic solids II: crystal and quasicrystal classes D_2m+1d, D_2m+1 and C_2m+1v

H. Xiao, O.T. Bruhns, A. Meyers

Arch. Mech. 52 (1), 55-88, 2000

Keywords:

Abstract

A simple, unified procedure is applied to derive irreducible nonpolynomial representations for scalar-, vector-, skewsymmetric and symmetric second order tensor-valued anisotropic constitutive equations involving any finite number of vector variables and second order tensor variables. In this part, our concern is for all crystal classes and quasicrystal classes D_2m+1d , D_2m+1 and C_2m+1v for all integers m≥1.

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Vol 52, No 1 (2000)

Irreducible representations for constitutive equations of anisotropic solids II: crystal and quasicrystal classes D2m+1d, D2m+1 and C2m+1v

Abstract

Irreducible representations for constitutive equations of anisotropic solids II: crystal and quasicrystal classes D_2m+1d, D_2m+1 and C_2m+1v