Physics – Condensed Matter – Soft Condensed Matter
Scientific paper
2001-11-28
Phys. Rev. E 65, 051707 (2002)
Physics
Condensed Matter
Soft Condensed Matter
10 pages, 10 figures, RevTex, AmsTex
Scientific paper
10.1103/PhysRevE.65.051707
We give a geometric interpretation of the soft elastic deformation modes of nematic elastomers, with explicit examples, for both uniaxial and biaxial nematic order. We show the importance of body rotations in this non-classical elasticity and how the invariance under rotations of the reference and target states gives soft elasticity (the Golubovic and Lubensky theorem). The role of rotations makes the Polar Decomposition Theorem vital for decomposing general deformations into body rotations and symmetric strains. The role of the square roots of tensors is discussed in this context and that of finding explicit forms for soft deformations (the approach of Olmsted).
Kutter S.
Warner Marc
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