Critical free energy and Casimir forces in rectangular geometries

TL;DR

This paper analyzes the critical free energy and Casimir forces in rectangular geometries across different aspect ratios and dimensions, providing exact and perturbative results that match Monte Carlo data for the 3D Ising model.

Contribution

It introduces new analytic results for the critical Casimir force in various geometries and aspect ratios, including exact large-n limit and perturbative approaches for n=1.

Findings

Critical Casimir force is attractive in slabs and repulsive in rods at T_c.

Analytic results agree well with Monte Carlo data for 3D Ising model.

Force zero at cube geometry ($ ho=1$).

Abstract

We study the critical behavior of the free energy and the thermodynamic Casimir force in a $L_\parallel^{d-1} \times L$ block geometry in $2<d<4$ dimensions with aspect ratio $\rho=L/L_\parallel$ above, at, and below $T_c$ on the basis of the O$(n)$ symmetric $\phi^4$ lattice model with periodic boundary conditions (b.c.). We consider a simple-cubic lattice with isotropic short-range interactions. Exact results are derived in the large - $n$ limit describing the geometric crossover from film ($\rho =0$) over cubic $\rho=1$ to cylindrical ($\rho = \infty$) geometries. For $n=1$, three perturbation approaches are presented that cover both the central finite-size regime near $T_c$ for $1/4 \lesssim \rho \lesssim 3$ and the region outside the central finite-size regime well above and below $T_c$ for arbitrary $\rho$. At bulk $T_c$ of isotropic systems with periodic b.c., we predict the critical Casimir force in the vertical $(L)$ direction to be negative (attractive) for a slab ($\rho < 1$), positive (repulsive) for a rod ($\rho > 1$), and zero for a cube $(\rho=1)$. We also present extrapolations to the cylinder limit ($\rho=\infty$) and to the film limit ($\rho=0$) for $n=1$ and $d=3$. Our analytic results for finite-size scaling functions in the minimal renormalization scheme at fixed dimension $d=3$ agree well with Monte Carlo data for the three-dimensional Ising model by Hasenbusch for $\rho=1$ and by Vasilyev et al. for $\rho=1/6$ above, at, and below $T_c$.