Farthest points of sets in uniformly convex Banach spaces. (English) Zbl 0151.17601

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[1] E. Asplund,A direct proof of Straszewicz’ theorem in Hilbert space (to appear).
[2] —–,The potential of projections in Hilbert space (to appear).
[3] M. Edelstein,On some special types of exposed points of closed and bounded sets in Banach spaces, Indag. Math.28 (1966), 360–363. · Zbl 0141.11903
[4] V. L. Klee,Extremal structure of convex sets II, Math. Z.69 (1958), 90–104. · Zbl 0079.12502
[5] J. Lindenstrauss,On operators which attain their norm., Israel J. Math.1 (1963), 139–148. · Zbl 0127.06704
[6] S. Mazur,Über schwache Konvergenz in den Raumen (L p), Studia Math.4 (1933), 128–133. · Zbl 0008.31604
[7] R. R. Phelps,A representation theorem for bounded convex sets, Proc. Am. Math. Soc.11 (1960), 976–983. · Zbl 0098.07904
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