Finite-size scaling above the upper critical dimension

Abstract

We present a unified view of finite-size scaling (FSS) in dimension d above the upper critical dimension, for both free and periodic boundary conditions. We find that the modified FSS proposed some time ago to allow for violation of hyperscaling due to a dangerous irrelevant variable, applies only to k=0 fluctuations, and so there is only a single exponent eta describing power-law decay of correlations at criticality, in contrast to recent claims. With free boundary conditions the finite-size "shift" is greater than the rounding. Nonetheless, using T-TL, where TL is the finite-size pseudocritical temperature, rather than T-Tc, as the scaling variable, the data does collapse on to a scaling form which includes the behavior both at TL, where the susceptibility chi diverges like Ld/2 and at the bulk Tc where it diverges like L2. These claims are supported by large-scale simulations on the 5-dimensional Ising model.