Wolf method

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The Wolf method [1]. In order to calculate a volumetric property, the interaction between an ion and all the rest of the ions up to an infinite distance should be taken into account. However, in practice, summation has to be truncated somewhere. If the truncation is spherical, the sphere considered is not always electrically neutral, as the number of positive and negative ions at a distance no higher than the cut radius is not the same. Of course, the charge excess is located in a shell whose thickness equals to the distance between neighbor ions. D. Wolf proposed the approximation that all the charge excess can be considered to be located exactly on the surface of truncation sphere: that is to say to consider the shell infinitely thin. Under this approximation, the potential energy of an ion can be calculated as the summation of the interaction of that ion with the rest of the ions contained in that sphere plus a correction term due to the interaction with the charged surface.

where

According to electrostatic rules, the energy of the interaction between an ion with charge and a spherical charged surface of radium centered in the ion is

is the charge of the sphere of radium centered in the ion :

Thus, the energy in the Wolf method is calculated as

The total potential can be split into two parts:

where



In the Wolf method it is suggested that the reciprocal space term of the Ewald Sum may be essentially ignored, provided one compensates the real space contribution by means of a truncation scheme.

Inhomogeneous systems[edit]

It appears to be the case (Ref. 3) that the Wolf method has problems for inhomogeneous systems.

See also[edit]

References[edit]

Related reading