Exponential Transformations in Lattice Dynamics

The note discusses the validity of the rotational invariance condition used in lattice dynamics. It is pointed out that rotations of non-central fields cannot be represented by displacements alone. Formulating the equations of lattice dynamics referred to Lagrangean co-ordinates imbedded in the crys

## Communicated by B. Brosowski For a class of one-dimensional lattice dynamical systems we prove the existence of periodic travelling waves with prescribed speed and arbitrary period. Then we study asymptotic behaviour of such waves for big values of period and show that they converge, in an appr

In this paper a new tool, i.e. the double exponential transform, is introduced for characterizing a non-linear dynamic circuit directly on the basis of its elements. The resulting characterization aims to improve the computational cost connected with the analysis and to add flexibility to the identi

We consider a class of unbounded spin systems (containing, in particular, anharmonic classical crystals) and construct the stochastic dynamics in the space of macroscopic fluctuations starting from a given microscopic stochastic time evolution.

For the nonlinear discrete dynamical system x s Tx on bounded, closed kq 1 k and convex set D ; R n , we present several sufficient and necessary conditions under which the unique equilibrium point is globally exponentially asymptotically stable. The infimum of exponential bounds of convergent traje