Power spectrum of mass and activity fluctuations in a sandpile

Abstract

We consider a directed abelian sandpile on a strip of size 2× n, driven by adding a grain randomly at the left boundary after every T time-steps. We establish the exact equivalence of the problem of mass fluctuations in the steady state and the number of zeroes in the ternary-base representation of the position of a random walker on a ring of size 3n. We find that while the fluctuations of mass have a power spectrum that varies as 1/f for frequencies in the range 3-2n f 1/T, the activity fluctuations in the same frequency range have a power spectrum that is linear in f.