7,026 research outputs found
Modified Korteweg-de Vries Hierachies in Multiple-Times Variables and the Solutions of Modified Boussinesq Equations
We study solitary-wave and kink-wave solutions of a modified Boussinesq
equation through a multiple-time reductive perturbation method. We use
appropriated modified Korteweg-de Vries hierarchies to eliminate secular
producing terms in each order of the perturbative scheme. We show that the
multiple-time variables needed to obtain a regular perturbative series are
completely determined by the associated linear theory in the case of a
solitary-wave solution, but requires the knowledge of each order of the
perturbative series in the case of a kink-wave solution. These appropriate
multiple-time variables allow us to show that the solitary-wave as well as the
kink-wave solutions of the modified Botussinesq equation are actually
respectively a solitary-wave and a kink-wave satisfying all the equations of
suitable modified Korteweg-de Vries hierarchies.Comment: RevTex file, submitted to Proc. Roy. Soc. London
Sandpile model on an optimized scale-free network on Euclidean space
Deterministic sandpile models are studied on a cost optimized
Barab\'asi-Albert (BA) scale-free network whose nodes are the sites of a square
lattice. For the optimized BA network, the sandpile model has the same critical
behaviour as the BTW sandpile, whereas for the un-optimized BA network the
critical behaviour is mean-field like.Comment: Five pages, four figure
Chaos in Sandpile Models
We have investigated the "weak chaos" exponent to see if it can be considered
as a classification parameter of different sandpile models. Simulation results
show that "weak chaos" exponent may be one of the characteristic exponents of
the attractor of \textit{deterministic} models. We have shown that the
(abelian) BTW sandpile model and the (non abelian) Zhang model posses different
"weak chaos" exponents, so they may belong to different universality classes.
We have also shown that \textit{stochasticity} destroys "weak chaos" exponents'
effectiveness so it slows down the divergence of nearby configurations. Finally
we show that getting off the critical point destroys this behavior of
deterministic models.Comment: 5 pages, 6 figure
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