Edgeworth series expansion of the truncated Cauchy function and its effectiveness in the study of atomic heterogeneity
- Resource Type
- research-article
- Authors
- Mukhopadhyay, A.; Bhowmick, K.; Mitra, G.B.
- Source
- Zeitschrift für Kristallographie - Crystalline Materials: International journal for structural, physical, and chemical aspects of crystalline materials. 215(12):718-726
- Subject
- General Aspects
- Language
- English
- ISSN
- 2196-7105
2194-4946
The effectiveness of a near Gaussian distribution, namely the Edgeworth Series representation of a truncated Cauchy distribution in studying heterogeneous cases has been studied for space group P¯1. Though moments do not exist for a Chauchy distribution a truncated Cauchy distribution has finite moments whose value depends on the truncation limit. A number of real examples with varying degrees of heterogeneity have been considered and the effect of truncation at various cut-off values has been studied. This approach has been compared with that of the exact approach method for which expression for cumulative probability for equal and heterogeneous cases (considering two seperate parameters, p= NH/NL and g = fH/fL) have been derived.