Farthest Point Problem and Partial Statistical Continuity in Normed Linear Spaces

Abstract

In this paper, we prove that if E is a uniquely remotal subset of a real normed linear space X such that E has a Chebyshev center c ∈ X and the farthest point map F:X→ E restricted to [c,F(c)] is partially statistically continuous at c, then E is a singleton. We obtain a necessary condition on uniquely remotal subsets of uniformly rotund Banach spaces to be a singleton. Moreover, we show that there exists a remotal set M having a Chebyshev center c such that the farthest point map F:R→ M is not continuous at c but is partially statistically continuous there in the multivalued sense.