Finite-size estimates of Kirkwood-Buff and similar integrals

Abstract

Recently, Kr\"uger and Vlugt [Phys. Rev. E 97, 051301(R) (2018)] have proposed a method to approximate an improper integral ∫0∞ dr\, F(r), where F(r) is a given oscillatory function, by a finite-range integral ∫0L dr\, F(r) W(r/L) with an appropriate weight function W(x). The method is extended here to an arbitrary (embedding) dimensionality d. A study of three-dimensional Kirkwood-Buff integrals, where F(r)=4π r2h(r), and static structure factors, where F(r)=(4π/q) r(qr) h(r), h(r) being the pair correlation function, shows that, in general, a choice d≠ 3 (e.g., d=7) for the embedding dimensionality may significantly reduce the error of the approximation ∫0∞ dr\, F(r) ∫0L dr\, F(r) W(r/L).