Short period attractors and non-ergodic behavior in the deterministic fixed energy sandpile model
arXiv:cond-mat/0207674 · doi:10.1209/epl/i2003-00561-8
Abstract
We study the asymptotic behaviour of the Bak, Tang, Wiesenfeld sandpile automata as a closed system with fixed energy. We explore the full range of energies characterizing the active phase. The model exhibits strong non-ergodic features by settling into limit-cycles whose period depends on the energy and initial conditions. The asymptotic activity $Ï_a$ (topplings density) shows, as a function of energy density $ζ$, a devil's staircase behaviour defining a symmetric energy interval-set over which also the period lengths remain constant. The properties of $ζ$-$Ï_a$ phase diagram can be traced back to the basic symmetries underlying the model's dynamics.
EPL-style, 7 pages, 3 eps figures, revised version