Mathematical Problems in Elasticity
In this volume, five papers are collected that give a good sample of the problems and the results characterizing some recent trends and advances in this theory. Some of them are devoted to the improvement of a general abstract knowledge of the behavior of elastic bodies, while the others mainly deal with more applicative topics.
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Collected Results on Finite Amplitude Plane Waves
Decay Estimates for BoundaryValue Problems in Linear
On the Traction Problem in Incompressible Linear Elasticity
An Abstract Perturbation Problem with Symmetries
Maximum Principles in Classical Elasticity
acoustic axes aether aether drift affine representation assume atom axis basic static deformation biharmonic equation Bohr boundary conditions boundary value BT'a BT'b C(Vu century constant decay estimates decay rate defined denote domains Einstein elasticity elastostatics electric electron elliptic energy energy-flux velocity exponential exponential decay finite follows function Galileo given glass heat Heisenberg Hence Horgan and Payne inequality Laplace's equation Lemma linear subspace mapping Math mathematical Max Born maximum principle Mech Michelson Mooney-Rivlin material motion Muybridge Newton nonlinear obtained Oleinik optical partial differential equations particles photons physicists physics plane polarisation directions polarized propagation direction quantized quantum mechanics ray slowness ray surface Royal Society Rumford Saint-Venant Saint-Venant's principle satisfies scientific scientists second-order semi-infinite strip slowness surface solution to system spatial decay stress subharmonic functions symmetries Talbot tensor Theorem theory vector wave propagating wave speeds wavelength Wheatstone yields