Dynamic Poverty Measures ()
Abstract
In this paper one considers a general approach to construct a poverty index. In particular from a general perspective, first and second order conditions based on a general poverty intensity function are derived. Then using specific intensity functions defined by Sen, FGT and Shorrock respectively, one specifies related first and second conditions. An extension based on a large class of intensity function is also investigated.
Share and Cite:
E. Kouassi, P. Mendy, D. Seck and K. Kymn, "Dynamic Poverty Measures,"
Theoretical Economics Letters, Vol. 1 No. 3, 2011, pp. 63-69. doi:
10.4236/tel.2011.13014.
Conflicts of Interest
The authors declare no conflicts of interest.
References
[1]
|
P. G. Ciarlet, “Introduction à l’analyse Numérique Matricielle et à l’optimisation,” Dunod, Paris, 2006.
|
[2]
|
J. M. Dia and D. Popescu, “Commande Optimale, Conception Optimisée des Systèmes,” Diderot Arts et Sciences, Paris, 1996.
|
[3]
|
J. S. Rustagi, “Optimization Techniques in Statistics,” AP Harcourt Brace and Company Publishers, San Diego, 1997.
|
[4]
|
R. Mart, “Optimisation Intertemporelles: Application aux Modèles Macroéconomiques,” Economica, Paris 1997.
|
[5]
|
M. Troutman, “Calculus of Variations with Elementary Convexity,” Springer-Verlag, New York, 1980.
|