Primal-dual partitions in linear semi-infinite programming with bounded coefficients

Abstract: We consider two partitions over the space of linear semi-infinite programming parameters with a fixed index set and bounded coefficients (the constraint functions are bounded). The first one is the primal-dual partition inspired by consistency and boundedness of the optimal value of the problem. The second one is a refinement of the primal-dual partition that arises by considering also the boundedness of the optimal set. These two partitions have been studied in the continuous case, i.e., when the set of indic… Show more