A counterexample to the Bishop-Phelps Theorem in complex spaces |
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| Authors: | Victor Lomonosov |
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| Affiliation: | (1) Department of Mathematics, Kent State University, 44242 Kent, OH, USA |
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| Abstract: | The Bishop-Phelps Theorem asserts that the set of functionals which attain the maximum value on a closed bounded convex subsetS of a real Banach spaceX is norm dense inX *. We show that this statement cannot be extended to general complex Banach spaces by constructing a closed bounded convex set with no support points. |
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