Accurate estimate of the critical exponent for self-avoiding walks via a fast implementation of the pivot algorithm
Abstract
We introduce a fast implementation of the pivot algorithm for self-avoiding walks, which we use to obtain large samples of walks on the cubic lattice of up to 33 × 106 steps. Consequently the critical exponent for three-dimensional self-avoiding walks is determined to great accuracy; the final estimate is =0.587597(7). The method can be adapted to other models of polymers with short-range interactions, on the lattice or in the continuum.
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