- Title
- Convergence of lattice sums and Madelung’s constant
- Creator
- Borwein, David; Borwein, Jonathan M.; Taylor, Keith F.
- Relation
- Journal of Mathematical Physics Vol. 26, Issue 11, p. 2999-3009
- Publisher Link
- http://dx.doi.org/10.1063/1.526675
- Publisher
- American Institute of Physics
- Resource Type
- journal article
- Date
- 1985
- Description
- The lattice sums involved in the definition of Madelung’s constant of an NaCl-type crystal lattice in two or three dimensions are investigated. The fundamental mathematical questions of convergence and uniqueness of the sum of these, not absolutely convergent, series are considered. It is shown that some of the simplest direct sum methods converge and some do not converge. In particular, the very common method of expressing Madelung’s constant by a series obtained from expanding spheres does not converge. The concept of analytic continuation of a complex function to provide a basis for an unambiguous mathematical definition of Madelung’s constant is introduced. By these means, the simple intuitive direct sum methods and the powerful integral transformation methods, which are based on theta function identities and the Mellin transform, are brought together. A brief analysis of a hexagonal lattice is also given.
- Subject
- lattice sums; Madelung’s constant; convergence; theta function identities; Mellin transform
- Identifier
- http://hdl.handle.net/1959.13/1043576
- Identifier
- uon:14223
- Identifier
- ISSN:0022-2488
- Rights
- © American Institute of Physics
- Language
- eng
- Full Text
- Reviewed
- Hits: 5647
- Visitors: 8359
- Downloads: 2480
Thumbnail | File | Description | Size | Format | |||
---|---|---|---|---|---|---|---|
View Details Download | ATTACHMENT01 | Publisher version (open access) | 711 KB | Adobe Acrobat PDF | View Details Download |