1205.3592 (M. Mulansky et al.)
M. Mulansky, A. Pikovsky
We study scaling properties of energy spreading in disordered strongly nonlinear lattices. Such lattices consist of nonlinearly coupled local linear or nonlinear oscillators, and demonstrate a rather slow, subdiffusive spreading of initially localized wave packets. We use a nonlinear diffusion equation as a heuristic model of this process, and confirm that the scaling predictions resulting from the self-similar solution of this equation are indeed valid for all studied cases. We show that the spreading in nonlinearly coupled linear oscillators slows down compared to a pure power law, while for nonlinear local oscillators a power law is valid in the whole studied range of parameters.
View original:
http://arxiv.org/abs/1205.3592
No comments:
Post a Comment