Publications de l'Institut Mathématique, Nouvelle Série, Vol. 95[109], pp. 229

Publications de l'Institut Mathématique, Nouvelle Série
Vol. 95[109], pp. 229–238 (2014)

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ON THE FARTHEST POINTS IN CONVEX METRIC SPACES AND LINEAR METRIC SPACES

Sangeeta, T. D. Narang

Department of Mathematics, Amardeep Singh Shergill Memorial College, Mukandpur-144507, Punjab (India); Department of Mathematics, Guru Nanak Dev University, Amritsar-143005 (India)

Abstract: We prove some results on the farthest points in convex metric spaces and in linear metric spaces. The continuity of the farthest point map and characterization of strictly convex linear metric spaces in terms of farthest points are also discussed.

Keywords: Chebyshev centre, convex metric space, externally convex metric space, farthest point, farthest point map, $M$-space, strictly convex linear metric space, remotal set, uniquely remotal set

Classification (MSC2000): 46B20, 46B99, 46C15, 46C99, 41A65

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Electronic fulltext finalized on: 31 Mar 2014. This page was last modified: 2 Apr 2014.

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