This folder holds the following references to publications, sorted by year and author.
There are 85 references in this bibliography folder.
Atkinson, A and Brandolini, A
On data: a case study of the evolution of income inequality across time and across countries
Cambridge Journal of Economics, 33(3):381-404.
Atkinson, AB, Piketty, T, and Saez, E
Top incomes in the long run of history
National Bureau of Economic Research, NBER Working Papers(15408).
Bach, S, Corneo, G, and Steiner, V
From bottom to top: The entire income distribution in Germany, 1992-2003
Review of Income and Wealth, 55(2):303-330.
Chakrabarti, A and Chakrabarti, B
Microeconomics of the ideal gas like market models
Physica A, 388:4151-4158.
Taxes in a simple wealth distribution model by inelastically scattering particles
Interdisciplinary Description of Complex Systems, 7(1):1-7.
Lux, T and Westerhoff, F
Nature Physics, 5(2).
Wealth redistribution in conservative linear kinetic models with taxation
Europhysics Letters, 88:10007.
Toscani, G and Brugna, C
Wealth distribution in Boltzmanlike models of conservative economies
In: Econophysics and Economics of Games , Social Choices and Quantitaive Techniques, ed. by Basu et al, Springer, Milan.
Yakovenko, V and Rosser, J
Colloquium: Statistical mechanics of money, wealth, and income
arXiv.org, Quantitative Finance Papers(0905.1518).
Düring, B, Matthes, D, and Toscani, G
Kinetic equations modelling wealth redistribution: A comparison of approaches
Center of Finance and Econometrics, University of Konstanz, CoFE Discussion Paper(08-03).
Chatterjee, A and Chakrabarti, B
Kinetic exchange models for income and wealth distribution
European Physical Journal B, 60:135-149.
Garibaldi, U, Scalas, E, and Viarengo, P
Statistical equilibrium in simple exchange games II
European Physical Journal B, 60:241-246.
Hegyi, G, Néda, Z, and Santos, MA
Wealth distribution and Pareto’s law in the Hungarian medieval society
Physica A, 380:271-277.
Hogg, R, Mckean, J, and Craig, A
Introduction to mathematical statistics
Pearson Education, Delhi.
Applied partial differential equations
The Inequality Process as a wealth maximizing process
Physica A Statistical Mechanics and its Applications, 367:388-414.
Chakrabarti, B, Chakraborti, A, and Chatterjee, A
Econophysics and Sociophysics
Gallegati, M, Keen, S, Lux, T, and Ormerod, P
Worrying trends in Econophysics
Physica A, 370:1-6.
Models of wealth distributions - A perspective
In: Econophysics and Sociophysics, ed. by Chakrabarti B. K., A. Chakraborti, and A. Chatterjee, Wiley-VCH, Berlin.
Generic features of the wealth distribution in ideal-gas-like markets
arXiv.org, Quantitative Finance Papers(physics/0603141).
Patriarca, M, Chakraborti, A, and Germano, G
Influence of the saving propoensity on the power-law tail of the wealth distribution
Physica A, 369:723-726.
Scalas, E, Garibaldi, U, and Donadio, S
Statistical equilibrium in simple exchange games I: Methods of solution and application of to the Bennati-Dragulescu-Yakovenko (BDY) game
European Physical Journal B, 53:267-272.
Evidence for power-law tail of the wealth distribution in India
Physica A, 359:555-562.
Bhattacharya, K, Mukherjee, G, and Manna, S
Detailed simulation results for some wealth distribution models in econophysics
In: Econophysics of wealth distributions, ed. by Chatterjee A., S. Yarlagadda, and B. K. Chakrabarti, Springer Verlag, Milan.
Chatterjee, A, Chakrabarti, B, and Stinchcombe, R
Master equation for a kinetic model of a trading market and its analytical solution
Physical Review E, 72:026126.