English

Dissipative Abelian Sandpile Models

Mathematical Physics 2015-09-02 v1 Statistical Mechanics math.MP Probability Exactly Solvable and Integrable Systems

Abstract

We introduce a family of abelian sandpile models with two parameters n,mNn, m \in {\bf N} defined on finite lattices on dd-dimensional torus. Sites with 2dn+m2dn+m or more grains of sand are unstable and topple, and in each toppling mm grains dissipate from the system. Because of dissipation in bulk, the models are well-defined on the shift-invariant lattices and the infinite-volume limit of systems can be taken. From the determinantal expressions, we obtain the asymptotic forms of the avalanche propagators and the height-(0,0)(0,0) correlations of sandpiles for large distances in the infinite-volume limit in any dimensions d2d \geq 2. We show that both of them decay exponentially with the correlation length ξ(d,a)=(dsinh1a(a+2) )1, \xi(d, a)=(\sqrt{d} \sinh^{-1} \sqrt{a(a+2)} \ )^{-1}, if the dissipation rate a=m/(2dn)a =m/(2dn) is positive. By considering a series of models with increasing nn, we discuss the limit a0a \downarrow 0 and the critical exponent defined by νa=lima0logξ(d,a)/loga\nu_{a}=- \lim_{a \downarrow 0} \log \xi(d, a)/ \log a is determined as νa=1/2 \nu_{a}=1/2 for all d2d \geq 2. Comparison with the q0q \downarrow 0 limit of qq-state Potts model in external magnetic field is discussed.

Keywords

Cite

@article{arxiv.1505.00334,
  title  = {Dissipative Abelian Sandpile Models},
  author = {Makoto Katori},
  journal= {arXiv preprint arXiv:1505.00334},
  year   = {2015}
}

Comments

AMS-LaTeX, 33 pages, 6 figures

R2 v1 2026-06-22T09:26:59.228Z