In this article, we focus to study about well-posedness of a generalized mixed vector variational-like inequality and optimization problems with aforesaid inequality as constraint. We establish the metric characterization of well-posedness in terms of approximate solution set.Thereafter, we prove the sufficient conditions of generalized well-posedness by assuming the boundedness of approximate solution set. We also prove that the well-posedness of considered optimization problems is closely related to that of generalized mixed vector variational-like inequality problems. Moreover, we present some examples to investigate the results established in this paper.

Publié le : 2017-08-13
Classification:  Generalized mixed vector variational-like inequality problems, well-posedness, relaxed $\eta$-$\alpha$-$P$-monotonicity,  49K40, 54C60, 90C33

@article{mc2096,
     author = {Jayswal, Anurag and Jha, Shalini},
     title = {Well-posedness for generalized mixed vector variational-like inequality problems in Banach space},
     journal = {Mathematical Communications},
     volume = {22},
     number = {1},
     year = {2017},
     pages = { 287-302},
     language = {eng},
     url = {http://dml.mathdoc.fr/item/mc2096}
}

Jayswal, Anurag; Jha, Shalini. Well-posedness for generalized mixed vector variational-like inequality problems in Banach space. Mathematical Communications, Tome 22 (2017) no. 1, pp.  287-302. http://gdmltest.u-ga.fr/item/mc2096/