Lexicographic multi-objective linear programming using grossone methodology: Theory and algorithm

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摘要

Numerous problems arising in engineering applications can have several objectives to be satisfied. An important class of problems of this kind is lexicographic multi-objective problems where the first objective is incomparably more important than the second one which, in its turn, is incomparably more important than the third one, etc. In this paper, Lexicographic Multi-Objective Linear Programming (LMOLP) problems are considered. To tackle them, traditional approaches either require solution of a series of linear programming problems or apply a scalarization of weighted multiple objectives into a single-objective function. The latter approach requires finding a set of weights that guarantees the equivalence of the original problem and the single-objective one and the search of correct weights can be very time consuming. In this work a new approach for solving LMOLP problems using a recently introduced computational methodology allowing one to work numerically with infinities and infinitesimals is proposed. It is shown that a smart application of infinitesimal weights allows one to construct a single-objective problem avoiding the necessity to determine finite weights. The equivalence between the original multi-objective problem and the new single-objective one is proved. A simplex-based algorithm working with finite and infinitesimal numbers is proposed, implemented, and discussed. Results of some numerical experiments are provided.

论文关键词:Multi-objective optimization,Lexicographic problems,Numerical infinitesimals,Grossone infinity computing

论文评审过程:Received 21 December 2016, Revised 13 April 2017, Accepted 20 May 2017, Available online 1 June 2017, Version of Record 18 October 2017.

论文官网地址:https://doi.org/10.1016/j.amc.2017.05.058