Necessary optimality conditions for interval optimization problems with inequality constraints using constrained interval arithmetic

Actas de congresos

Fecha

2018-01-01

Registro en:

Communications in Computer and Information Science, v. 831, p. 439-449.

1865-0929

http://hdl.handle.net/11449/171305

10.1007/978-3-319-95312-0_38

2-s2.0-85051050352

Autor

Universidade Estadual Paulista (Unesp)

Federal University of Triângulo Mineiro (UFTM)

Institución

Universidade Estadual Paulista (Brasil)

Resumen

This article is devoted to obtaining necessary optimality conditions for optimization problems with interval-valued objective and interval inequality constraints. These objective and constraint functions are obtained from continuous functions by using constrained interval arithmetic. We give a concept of derivative for this class of interval-valued functions and we find necessary conditions based on Karush-Kunh-Tucker theorem in their interval version. We present an example to illustrate our results.

Materias

Constrained interval arithmetic

Interval optimization problem

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