Scaling and Persistence in the Two-Dimensional Ising Model
Abstract
The spatial distribution of persistent spins at zero-temperature in the pure two-dimensional Ising model is investigated numerically. A persistence correlation length, (t) tZ is identified such that for length scales r<< (t) the persistent spins form a fractal with dimension df; for length scales r>> (t) the distribution of persistent spins is homogeneous. The zero-temperature persistence exponent, θ, is found to satisfy the scaling relation θ = Z(2-df) with θ =0.209 0.002, Z=1/2 and df 1.58.
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