On duality in multiple objective linear programming
Copyright policy )On duality in multiple objective linear programming
In this paper we present two approaches to duality in multiple objective linear programming. The first approach is based on a duality relation between maximal elements of a set and minimal elements of its complement. It offers a general duality scheme which unifies a number of known dual constructions and improves several existing duality relations. The second approach utilizes polarity between a convex polyhedral set and the epigraph of its support function. It leads to a parametric dual problem and yields strong duality relations, including those of geometric duality.
- University of Avignon France
Linear programming, normal cone, duality, [MATH] Mathematics [math], Optimality conditions and duality in mathematical programming, multiple objective linear problem, Multi-objective and goal programming
Linear programming, normal cone, duality, [MATH] Mathematics [math], Optimality conditions and duality in mathematical programming, multiple objective linear problem, Multi-objective and goal programming
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