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386.

Finitely Well-Positioned Sets
By Massimo Marinacci and Luigi Montrucchio

We introduce and study finitely well-positioned sets, a class of asymptotically “narrow” sets that generalize the well-positioned sets recently investigated by Adly, Ernst and Thera in [1] and [3], as well as the plastering property of Krasnoselskii.

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Last updated April 4, 2011