Dresden 2011 – scientific programme

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DY: Fachverband Dynamik und Statistische Physik

DY 23: Nonlinear Waves/ Nonlinear Lattices

DY 23.3: Talk

Wednesday, March 16, 2011, 14:45–15:00, ZEU 255

A generalized spreading conjecture in 2D nonlinear disordered media — •Joshua Bodyfelt and Sergej Flach — Max Planck Institut für Physik komplexer Systeme, Dresden

It is generally accepted that the presence of nonlinearity in a random lattice couples the lattice’s localized Anderson modes. This coupling then allows mode resonances, which in turn are responsible for spreading of initially compact, localized wavepackets. The spreading is measurable via several moments, all showing a characteristic subdiffusive behavior of  t^α, where α<1. Numerical investigations confirm the validity of these measures, including a recent work [1] which discusses the novel appearance of a dynamical crossover from strong to weak resonances (please see talk by T.V. Laptyeva). The concept of a tunable nonlinearity (with power order of σ > 0) also holds great interest [2], in that a critical power order is observed seperating the two regimes of strong and weak resonances. However, these works mainly focus on 1D systems. Within [3] a generalization was made to multidimensional lattices, with resonances on a wavepacket’s surface (as opposed to those within the internal volume) being claimed as the main mechanism for spreading. Here, we present for 2D lattices further numerical investigations into this claim.
T.V. Laptyeva et al., Europhys. Lett. 91, 30001 (2010).
Ch. Skokos & S. Flach, Phys. Rev. E 82, 016208 (2010); M. Mulansky & A. Pikovsky Europhys. Lett. 90, 10015 (2010); H. Veksler et al., Phys. Rev. E, 80 037201 (2009).
S. Flach, Chemical Physics 375, 548 (2010).