MÉTODO DEL PUNTO PROXIMAL y SUS APLICACIÓN A MODELOS ECONÓMICOS
DOI:
https://doi.org/10.15381/pes.v15i1.9605Keywords:
Proximal point methods, separable convex problems, nonnegative orthant, proximal distances, convex functions.Abstract
The aim of this work is to study the convergence of a extension of the proximal point method for minimizing a class of nonconvex functions on the nonnegative orthant and give some applications of the method in the solution of economics models which appears in microeconomy. The used procedures were the collection of information in scientific journals and specialized books, the study of the same and finally the use of mathematical tools to study the convergence of the sequence of the method. The results show that, under some appropriate assumptions, the iterations generated by the method are well defined and the sequence converges weakly to a KKT point.
Downloads
Published
Issue
Section
License
Copyright (c) 2012 Lucy Haydee De La Cruz Cuadros, Erik Alex Papa Quiroz
This work is licensed under a Creative Commons Attribution-NonCommercial-ShareAlike 4.0 International License.
THE AUTHORS RETAIN THEIR RIGHTS:
a) The authors retain their trademark and patent rights, and also on any process or procedure described in the article.
b) The authors retain the right to share, copy, distribute, execute and publicly communicate the article published in Pesquimat magazine (for example, place it in an institutional repository or publish it in a book), with recognition of its initial publication in the Pesquimat magazine.
c) The authors retain the right to make a later publication of their work, to use the article or any part of it (for example: a compilation of their works, notes for conferences, thesis, or for a book), provided that they indicate the source of publication (authors of the work, magazine, volume, number and date).
