Aspect-Ratio Scaling of Domain Wall Entropy for the 2D J Ising Spin Glass
Abstract
The ground state entropy of the 2D Ising spin glass with +1 and -1 bonds is studied for L × M square lattices with L M and p = 0.5, where p is the fraction of negative bonds, using periodic and/or antiperiodic boundary conditions. From this we obtain the domain wall entropy as a function of L and M. It is found that for domain walls which run in the short, L direction, there are finite-size scaling functions which depend on the ratio M / LdS, where dS = 1.22 0.01. When M is larger than L, very different scaling forms are found for odd L and even L. For the zero-energy domain walls, which occur when L is even, the probability distribution of domain wall entropy becomes highly singular, and apparently multifractal, as M / LdS becomes large.
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