Nonlinear viscoelastic response in two dimensions—numerical modeling and experimental verification

## An algorithm for constructing nonlinear o-models in arbitrary space-dimensions m (m > 2) is proposed and Hamiltonian estimates are found through the degree of mapping. The field models are constructed in general forms and the scaling-neutral models are shown to have exact soliton solutions wh

Dispersion relations and sum rules are derived for the complex rotatory power of an arbitrary linear (nonmagnetic) isotropic medium showing natural optical activity. Both previously known dispersion relations and sum rules as well as new ones are obtained. It is shown that the Rosenfeld-Condon dispe

for which the action is finite and stationary under variations, without assuming any additional boundary conditions at infinity. An element of the proof is the vanishing of the stress tensor for a finite action solution, which actually holds true for the general O(N) o-model. For the two-dimensional