Convergence on closed convex sets in a locally convex space |
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Authors: | Sangho Kum |
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Institution: | Department of Applied Mathematics , Korea Maritime University , Pusan, 606-791, Korea |
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Abstract: | The purpose of this paper is to compare several kinds of convergences on the space C(X) of nonempty closed convex subsets of a locally convex space X. First we verify that the AW-convergence on C(X) is weaker than the metric Attouch-Wets convergence on C(X) of a metrizable locally convex space X. Moreover, we show that X is normable if and only if the two convergences on C(X × R) are equivalent. Secondly we define two convergences on C(X) analogous to the corresponding ones in a normed linear space, and investigate some basic properties of these convergences and compare them. |
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