6533b7d3fe1ef96bd1260b7f
RESEARCH PRODUCT
On multi-scale percolation behaviour of the effective conductivity for the lattice model with interacting particles
R. PiaseckiD. FrączekW. OlchawaR. Wiśniowskisubject
Statistics and ProbabilityPhysicsPercolation critical exponentsCondensed matter physicsStatistical Mechanics (cond-mat.stat-mech)business.industryFOS: Physical sciencesPercolation thresholdConductivityCondensed Matter Physics01 natural sciencesDirected percolation010305 fluids & plasmasLattice (order)0103 physical sciencesMicroemulsionFixed length010306 general physicsbusinessThermal energyCondensed Matter - Statistical Mechanicsdescription
Recently, the effective medium approach using 2x2 basic cluster of model lattice sites to predict the conductivity of interacting droplets has been presented by Hattori et al. To make a step aside from pure applications, we have studied earlier a multi-scale percolation, employing any kxk basic cluster for non-interacting particles. Here, with interactions included, we examine in what way they alter the percolation threshold for any cluster case. We found that at a fixed length scale k the interaction reduces the range of shifts of the percolation threshold. To determine the critical concentrations, the simplified model is used. It diminishes the number of local conductivities into two main ones. In the presence of a dominance of the repulsive interaction over the thermal energy, the exact percolation thresholds at scales k=2 and 3 can be obtained from analytical formulas. Furthermore, by a simple reasoning, we obtain the limiting threshold formula for odd k. When k>>1, the odd-even difference becomes negligible. Hence, the 0.75 is the highest possible value of the threshold.
| year | journal | country | edition | language |
|---|---|---|---|---|
| 2015-06-16 |