Issue 4, 2024

An OrthoBoXY-method for various alternative box geometries

Abstract

We have shown in a recent contribution [Busch and Paschek, J. Phys. Chem. B, 2023 127, 7983–7987] that for molecular dynamics (MD) simulations of isotropic fluids based on orthorhombic periodic boundary conditions with “magical” box length ratios of Lz/Lx = Lz/Ly = 2.7933596497, the computed self-diffusion coefficients Dx and Dy in x- and y-direction become system size independent. They thus represent the true self-diffusion coefficient D0 = (Dx + Dy)/2, while the shear viscosity can be determined from diffusion coefficients in x-, y-, and z-direction, using the expression η = kBT·8.1711245653/[3πLz(Dx + Dy − 2Dz)]. Here we present a more generalized version of this “OrthoBoXY”-approach, which can be applied to any orthorhombic MD box of any shape. In particular, we would like to test, how the efficiency is affected by using a shape more akin to the cubic form, albeit with different box length ratios Lx/LzLy/Lz and Lx < Ly < Lz. We use NVT and NpT simulations of systems of 1536 TIP4P/2005 water molecules as a benchmark and explore different box geometries to determine the influence of the box shape on the computed statistical uncertainties for D0 and η. Moreover, another “magical” set of box length ratios is discovered with Ly/Lz = 0.57804765578 and Lx/Lz = 0.33413909235, where the self-diffusion coefficient in x-direction becomes system size independent, such that D0 = Dx.

Graphical abstract: An OrthoBoXY-method for various alternative box geometries

Article information

Article type
Paper
Submitted
10 Okt 2023
Accepted
06 Dis 2023
First published
07 Dis 2023

Phys. Chem. Chem. Phys., 2024,26, 2907-2914

An OrthoBoXY-method for various alternative box geometries

J. Busch and D. Paschek, Phys. Chem. Chem. Phys., 2024, 26, 2907 DOI: 10.1039/D3CP04916G

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