English

Relation between bulk order-parameter correlation function and finite-size scaling

Statistical Mechanics 2009-10-31 v1

Abstract

We study the large-rr behavior of the bulk order-parameter correlation function G(r)G(\bf{r}) for T>TcT>T_c within the lattice ϕ4\phi^4 theory. We also study the large-LL behavior of the susceptibility χ\chi of the confined lattice system of size LL with periodic boundary conditions. The large-LL behavior of χ\chi is closely related to the large-rr behavior of G(r)G(\bf{r}). Explicit results are derived for d>2d>2. Finite-size scaling must be formulated in terms of the anisotropic exponential correlation length ξ1\xi_1 that governs the decay of G(r)G(\bf{r}) for large rr rather than in terms of the isotropic correlation length ξ\xi defined via the second moment of G(r)G(\bf{r}). This result modifies a recent interpretation concerning an apparent violation of finite-size scaling in terms of ξξ1\xi \neq \xi_1. Exact results for the d=1d=1 Ising model illustrate our conclusions. Furthermore, we show that the exponential finite-size behavior for L/ξ1L/\xi\gg 1 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 d>4d>4 are discussed. The two-variable finite-size scaling form predicts an approach eL/ξ1\propto e^{-L/\xi_1} to the bulk critical behavior whereas a single-variable scaling form implies a power-law approach Ld\propto L^{-d}.

Keywords

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