Relation between bulk order-parameter correlation function and finite-size scaling
Abstract
We study the large- behavior of the bulk order-parameter correlation function for within the lattice theory. We also study the large- behavior of the susceptibility of the confined lattice system of size with periodic boundary conditions. The large- behavior of is closely related to the large- behavior of . Explicit results are derived for . Finite-size scaling must be formulated in terms of the anisotropic exponential correlation length that governs the decay of for large rather than in terms of the isotropic correlation length defined via the second moment of . This result modifies a recent interpretation concerning an apparent violation of finite-size scaling in terms of . Exact results for the Ising model illustrate our conclusions. Furthermore, we show that the exponential finite-size behavior for is not captured by the standard perturbation approach that separates the lowest mode from the higher modes. Consequences for the theory of finite-size effects for are discussed. The two-variable finite-size scaling form predicts an approach to the bulk critical behavior whereas a single-variable scaling form implies a power-law approach .
Cite
@article{arxiv.cond-mat/9912367,
title = {Relation between bulk order-parameter correlation function and finite-size scaling},
author = {X. S. Chen and V. Dohm},
journal= {arXiv preprint arXiv:cond-mat/9912367},
year = {2009}
}
Comments
LaTex, 59 pages, accepted for publication in Eur. Phys. J.B