X iv : c ha o - dy n / 96 07 01 6 v 1 2 9 Ju l 1 99 6 Limit Set of Trajectories of the Coupled Viscous Burgers

ar X iv : c ha o - dy n / 96 06 01 6 v 1 1 J ul 1 99 6 Hopf ’ s last hope : spatiotemporal chaos in terms of unstable recurrent patterns

Spatiotemporally chaotic dynamics of a Kuramoto-Sivashinsky system is described by means of an infinite hierarchy of its unstable spatiotemporally periodic solutions. An intrinsic parametrization of the corresponding invariant set serves as accurate guide to the high-dimensional dynamics, and the periodic orbit theory yields several global averages characterizing the chaotic dynamics.

ha o - dy n / 93 07 01 1 v 1 2 6 Ju l 1 99 3 Advection of vector fields by chaotic flows 1

" The high average vorticity that is known to exist in turbulent motion is caused by the extension of vortex filaments in an eddying fluid. "

ar X iv : c ha o - dy n / 96 01 01 7 v 1 24 J an 1 99 6 Tools for Nonlinear Analysis : I . Unfolding of Dynamical Systems

Automated algorithms for derivation of amplitude equations in the vicinity of monotonic and Hopf bifurcation manifolds are presented. The implementation is based on Mathematica programming, and is illustrated by several examples.

ha o - dy n / 96 07 01 9 v 1 3 1 Ju l 1 99 6 Thermodynamic formalism and localization in Lorentz gases and hopping models

The thermodynamic formalism expresses chaotic properties of dy-namical systems in terms of the Ruelle pressure ψ(β). The inverse-temperature like variable β allows one to scan the structure of the probability distribution in the dynamic phase space. This formalism is applied here to a Lorentz Lattice Gas, where a particle moving on a lattice of size L d collides with fixed scatterers placed at ...

ar X iv : c ha o - dy n / 99 10 00 5 v 1 6 O ct 1 99 9 The Finite - Difference Analysis and Time Flow