Investigating inequality: a Langevin approach
Inequality indices are quantitative scores that gauge the divergence of wealth distributions in human societies from the "ground state" of pure communism. While inequality indices were devised for socioeconomic applications, they are effectively applicable in the context of general non-neg...
| Main Author: | |
|---|---|
| Format: | Article |
| Language: | English |
| Published: |
Institute for Condensed Matter Physics
2017-03-01
|
| Series: | Condensed Matter Physics |
| Subjects: | |
| Online Access: | https://doi.org/10.5488/CMP.20.13001 |
| id |
doaj-67ad771d02fc4ce2a6c26f72405f7328 |
|---|---|
| record_format |
Article |
| spelling |
doaj-67ad771d02fc4ce2a6c26f72405f73282020-11-25T00:59:48ZengInstitute for Condensed Matter PhysicsCondensed Matter Physics1607-324X2017-03-012011300110.5488/CMP.20.13001Investigating inequality: a Langevin approach I. EliazarInequality indices are quantitative scores that gauge the divergence of wealth distributions in human societies from the "ground state" of pure communism. While inequality indices were devised for socioeconomic applications, they are effectively applicable in the context of general non-negative size distributions such as count, length, area, volume, mass, energy, and duration. Inequality indices are commonly based on the notion of Lorenz curves, which implicitly assume the existence of finite means. Consequently, Lorenz-based inequality indices are excluded from the realm of infinite-mean size distributions. In this paper we present an inequality index that is based on an altogether alternative Langevin approach. The Langevin-based inequality index is introduced, explored, and applied to a wide range of non-negative size distributions with both finite and infinite means.https://doi.org/10.5488/CMP.20.13001inequality indicesLorenz curvesLangevin equationGibbs densityscenario-based equality index |
| collection |
DOAJ |
| language |
English |
| format |
Article |
| sources |
DOAJ |
| author |
I. Eliazar |
| spellingShingle |
I. Eliazar Investigating inequality: a Langevin approach Condensed Matter Physics inequality indices Lorenz curves Langevin equation Gibbs density scenario-based equality index |
| author_facet |
I. Eliazar |
| author_sort |
I. Eliazar |
| title |
Investigating inequality: a Langevin approach |
| title_short |
Investigating inequality: a Langevin approach |
| title_full |
Investigating inequality: a Langevin approach |
| title_fullStr |
Investigating inequality: a Langevin approach |
| title_full_unstemmed |
Investigating inequality: a Langevin approach |
| title_sort |
investigating inequality: a langevin approach |
| publisher |
Institute for Condensed Matter Physics |
| series |
Condensed Matter Physics |
| issn |
1607-324X |
| publishDate |
2017-03-01 |
| description |
Inequality indices are quantitative scores that gauge the divergence of wealth distributions in human societies from the "ground state" of pure communism. While inequality indices were devised for socioeconomic applications, they are effectively applicable in the context of general non-negative size distributions such as count, length, area, volume, mass, energy, and duration. Inequality indices are commonly based on the notion of Lorenz curves, which implicitly assume the existence of finite means. Consequently, Lorenz-based inequality indices are excluded from the realm of infinite-mean size distributions. In this paper we present an inequality index that is based on an altogether alternative Langevin approach. The Langevin-based inequality index is introduced, explored, and applied to a wide range of non-negative size distributions with both finite and infinite means. |
| topic |
inequality indices Lorenz curves Langevin equation Gibbs density scenario-based equality index |
| url |
https://doi.org/10.5488/CMP.20.13001 |
| work_keys_str_mv |
AT ieliazar investigatinginequalityalangevinapproach |
| _version_ |
1725216006979190784 |