A lagrangian description of elastic motion in riemannian manifolds and an angular invariant of axially-symmetric elasticity tensors

Abstract

This article is a description of elasticity theory for readers with mathematical background. The first sections are an abridgment of parts of the book by Marsden and Hughes, including a compact identification of the equations of motion as the Euler-Lagrange equations for the lagrangian density. The other sections describe the basic first-order classification of materials, from the point of view of representation theory as opposed to index calculus. It includes a computation of the axes of symmetry, when they exist, for most of the irreducible components of the elasticity tensor. When the two components of the 5-dimensional type V5 have axes of symmetry, some invariants appear: 2 angles in S1 that measure the deviation of an associated decomposition V5 R2=V5 V5 from the standard one. See also the classification appearing for example in (Chadwick, Vianello, and Cowin) and (Bona, Bucataru, and Slawinski) by symmetry group in SO(3). A somewhat more representation-theoretic approach can be found in (Itin and Hehl), and a complete list of polynomial invariants for generic elasticity tensors can be found in (Boehler, Kirillov Jr, and Onat).