In this paper, we extend the notions of strong proximinality and strong Chebyshevity available in Banach spaces to metric spaces and prove that an approximatively compact subset W of a metric space X is strongly proximinal. Moreover, the converse holds if the the set of best approximants in W to each point of the space X is compact. It is proved that strongly Chebyshev sets are precisely the sets which are strongly proximinal and Chebyshev. Further, by extending the notion of local uniform convexity from Banach spaces to metric spaces, it is proved that a proximinal convex subset of a locally uniformly convex metric space is approximatively compact. As a consequence, it is observed that closed balls in a locally uniformly convex metric space are strongly Chebyshev. The results proved in the paper generalize and extend several known results on the subject.
@article{5733,
title = {Strong proximinality in metric spaces},
journal = {Novi Sad Journal of Mathematics},
volume = {46},
year = {2017},
language = {EN},
url = {http://dml.mathdoc.fr/item/5733}
}
Gupta, Sahil. Strong proximinality in metric spaces. Novi Sad Journal of Mathematics, Tome 46 (2017) . http://gdmltest.u-ga.fr/item/5733/