Ground state interface exponents of the diluted Sherrington-Kirkpatrick spin glass
Abstract
We present a large-scale simulation of the ground state interface properties of the diluted Sherrington-Kirkpatrick spin glass of Gaussian disorder for a broad range of the bond occupation probability p using the strong disorder renormalization group and the population annealing Monte Carlo methods. We find that the interface is space-filling independent of p, i.e., the fractal dimension ds=1. The stiffness exponent θ is likely also independent of p, despite that the energy finite-size correction exponent ω varies with p as recently found. The energy finite-size scaling is also analyzed and compared with that of the J disorder, finding that the thermodynamic energy is universal in both p and the disorder, and the exponent ω varies with p but is universal in the disorder.
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