Mapping of the Bak, Tang, and Wiesenfeld sandpile model on a two-dimensional Ising-correlated percolation lattice to the two-dimensional self-avoiding random walk

The self-organized criticality on the random fractal networks has many motivations, like the movement pattern of fluid in the porous media. In addition to the randomness, introducing correlation between the neighboring portions of the porous media has some nontrivial effects. In this paper, we consider the Ising-like interactions between the active sites as the simplest method to bring correlations in the porous media, and we investigate the statistics of the BTW model in it. These correlations are controlled by the artificial "temperature" T and the sign of the Ising coupling. Based on our numerical results, we propose that at the Ising critical temperature T-c the model is compatible with the universality class of two-dimensional (2D) self-avoiding walk (SAW). Especially the fractal dimension of the loops, which are defined as the external frontier of the avalanches, is very close to D-f(SAW) = 4/3. Also, the corresponding open curves has conformal invariance with the root-mean-square distance R-rms similar to t(3/4) (t being the parametrization of the curve) in accordance with the 2D SAW. In the finite-size study, we observe that at T = Tc the model has some aspects compatible with the 2D BTW model (e.g., the 1/log(L)-dependence of the exponents of the distribution functions) and some in accordance with the Ising model (e.g., the 1/L-dependence of the fractal dimensions). The finite-size scaling theory is tested and shown to be fulfilled for all statistical observables in T = T-c. In the off-critical temperatures in the close vicinity of Tc the exponents show some additional power-law behaviors in terms of T - T-c with some exponents that are reported in the text. The spanning cluster probability at the critical temperature also scales with L-1/2, which is different from the regular 2D BTW model.