ABSTRACT
In order to model the income data, the physical distributions of Fermi-Dirac and Bose-Einstein families have already been proposed in the literature. In this study, we generalize Fermi-Dirac distribution by using a q,p-deformed version of Fermi-Dirac distribution which provides the advantage of working with flexible free q, p deformation parameters as the regression parameters for modeling the income data. We analyze the accuracy of the generalized version, q,p-deformed Fermi-Dirac distribution, on describing the data of income share held by quintiles for countries, and household income for the states of U.S.A. in 2018. We also use minimization routine for modeling the data which leads to the best fit parameters for the deformation parameters q and p. Subsequently, we plot the fitted q,p-deformed Fermi-Dirac distribution as income distribution with the obtained deformation parameters, then find the statistical confidence values
from the fitted curve. We figure out that our model properly describes the income data for the systems experiencing a high level of income inequality, and also
values are correlated with the Gini index for those of considered systems.
Data Sharing Policy
The data that support the findings of this study are openly available in World Bank, https://data.worldbank.org/indicator?tab=all and in World Data
https://data.world/makeovermonday/2018-w-3-u-s-household-income-distribution-by-state
Compliance with Ethical Standards
Conflict of Interest:
Author Elif Dil declares that she has no conflict of interest. Author Emre Dil declares that he has no conflict of interest.
Ethical approval
This article does not contain any studies with human participants or animals performed by any of the authors.