NewEvery arXiv paper, its researchers & institutions — mapped.
paper

Effects of finite curvature on soliton dynamics in a chain of nonlinear oscillators

arXiv:cond-mat/0003146 · doi:10.1088/0953-8984/13/6/301

Abstract

We consider a curved chain of nonlinear oscillators and show that the interplay of curvature and nonlinearity leads to a number of qualitative effects. In particular, the energy of nonlinear localized excitations centered on the bending decreases when curvature increases, i.e. bending manifests itself as a trap for excitations. Moreover, the potential of this trap is double-well, thus leading to a symmetry breaking phenomenon: a symmetric stationary state may become unstable and transform into an energetically favorable asymmetric stationary state. The essentials of symmetry breaking are examined analytically for a simplified model. We also demonstrate a threshold character of the scattering process, i.e. transmission, trapping, or reflection of the moving nonlinear excitation passing through the bending.

13 pages (LaTeX) with 10 figures (EPS)