A partial order principle and vector variational principle for ε-efficient solutions in the sense of N\'emeth

Abstract

In this paper, we establish a partial order principle, which is useful to deriving vector Ekeland variational principle (denoted by EVP). By using the partial order principle and extending Gerstewitz's functions, we obtain a vector EVP for ε-efficient solutions in the sense of N\'emeth, which essentially improves the earlier results by removing a usual assumption for boundedness of range of the objective function. From this, we also deduce several special vector EVPs, which improve and generalize the related known results.