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Site and bond percolation on four-dimensional simple hypercubic lattices with extended neighborhoods (2109.11195v2)

Published 23 Sep 2021 in cond-mat.stat-mech

Abstract: The asymptotic behavior of the percolation threshold $p_c$ and its dependence upon coordination number $z$ is investigated for both site and bond percolation on four-dimensional lattices with compact extended neighborhoods. Simple hypercubic lattices with neighborhoods up to 9th nearest neighbors are studied to high precision by means of Monte-Carlo simulations based upon a single-cluster growth algorithm. For site percolation, an asymptotic analysis confirms the predicted behavior $zp_c \sim 16 \eta_c = 2.086$ for large $z$, and finite-size corrections are accounted for by forms $p_c \sim 16 \eta_c/(z+b)$ and $p_c \sim 1- \exp(-16 \eta_c/z)$ where $\eta_c \approx 0.1304$ is the continuum percolation threshold of four-dimensional hyperspheres. For bond percolation, the finite-$z$ correction is found to be consistent with the prediction of Frei and Perkins, $zp_{c} - 1 \sim a_{1} (\ln z)/z$, although the behavior $zp_{c} - 1 \sim a_1 z{-3/4}$ cannot be ruled out.

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