Heriot-Watt Mathematics Report Series
HWM06-26, 4 Jun 2006
Ground States and Defect Energies of the Two-dimensional XY Spin Glass from a Quasi-Exact Algorithm
M Weigel and M J P Gingras
Abstract
We employ a novel algorithm using a quasi-exact embedded-cluster matching technique as minimization method within a genetic algorithm to reliably obtain numerically exact ground states of the Edwards-Anderson XY\/} spin glass model with bimodal coupling distribution for square lattices of up to $28\times 28$ spins. Contrary to previous conjectures, the ground state of each disorder replica is non-degenerate up to a global O(2) rotation. The scaling of spin and chiral defect energies induced by applying several different sets of boundary conditions exhibits strong crossover effects. This suggests that previous calculations have yielded results far from the asymptotic regime. The novel algorithm and the aspect-ratio scaling technique consistently give $\theta_s=-0.308(30)$ and $\theta_c=-0.114(16)$ for the spin and chiral stiffness exponents, respectively.
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Full text: http://arxiv.org/abs/cond-mat?papernum=0510614
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