International Conference on Numerical Optimization in Engineering and Sciences - NOIEAS 2019, Warangal (India). 19-21 junio 2019
Resumen:
There are limited numbers of methods to choose the optimal choice among the multiple choices. A numerical technique named Newton’s Divided Difference Interpolation is used to find out the solution of multi-choice fractional stochastic transportation problem. Because of the uncertainty, the parameters of the problem supplies and demands are considered as multi-choice random parameters which are treated as independent random variables follows Logistic distribution. Also, the coefficients of the decision variables in the fractional objective function are taken as multi-choice type. To get the deterministic model, chance constrained programming is applied to the probabilistic constraints, and the transformed mathematical model is presented. An illustration illustrates the methodology and also solved using Lagrange’s Interpolation.
Palabras clave: Fractional programming; Multi-choice random parameter; Stochastic programming; Transportation problem
DOI: 
https://doi.org/10.1007/978-981-15-3215-3_28
Publicado en Numerical optimization in engineering and sciences, pp: 289-298, ISBN: 978-981-15-3214-6
Fecha de publicación: 2019-06-19.
Cita:
P. Agrawal, T. Ganesh, Solving multi-choice fractional stochastic transportation problem involving newton’s divided difference interpolation, International Conference on Numerical Optimization in Engineering and Sciences - NOIEAS 2019, Warangal (India). 19-21 junio 2019. En: Numerical optimization in engineering and sciences: Select Proceedings of NOIEAS 2019, ISBN: 978-981-15-3214-6
