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RESEARCH PRODUCT

Finite-size scaling above the upper critical dimension revisited: The case of the five-dimensional Ising model

Henk W. J. BlöteErik LuijtenErik LuijtenKurt Binder

subject

PhysicsStatistical Mechanics (cond-mat.stat-mech)Monte Carlo methodFOS: Physical sciencesCondensed Matter PhysicsElectronic Optical and Magnetic MaterialsMagnetizationFerromagnetismLattice (order)Periodic boundary conditionsIsing modelCritical dimensionScalingCondensed Matter - Statistical MechanicsMathematical physics

description

Monte Carlo results for the moments of the magnetization distribution of the nearest-neighbor Ising ferromagnet in a L^d geometry, where L (4 \leq L \leq 22) is the linear dimension of a hypercubic lattice with periodic boundary conditions in d=5 dimensions, are analyzed in the critical region and compared to a recent theory of Chen and Dohm (CD) [X.S. Chen and V. Dohm, Int. J. Mod. Phys. C (1998)]. We show that this finite-size scaling theory (formulated in terms of two scaling variables) can account for the longstanding discrepancies between Monte Carlo results and the so-called ``lowest-mode'' theory, which uses a single scaling variable tL^{d/2} where t=T/T_c-1 is the temperature distance from the critical temperature, only to a very limited extent. While the CD theory gives a somewhat improved description of corrections to the ``lowest-mode'' results (to which the CD theory can easily be reduced in the limit t \to 0, L \to \infty, tL^{d/2} fixed) for the fourth-order cumulant, discrepancies are found for the susceptibility (L^d ). Reasons for these problems are briefly discussed.

https://dx.doi.org/10.48550/arxiv.cond-mat/9901042