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Finitely Well-Positioned Sets

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  • Massimo Marinacci
  • Luigi Montrucchio

Abstract

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.

Suggested Citation

  • Massimo Marinacci & Luigi Montrucchio, 2011. "Finitely Well-Positioned Sets," Working Papers 386, IGIER (Innocenzo Gasparini Institute for Economic Research), Bocconi University.
    • Handle: RePEc:igi:igierp:386
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    File URL: https://repec.unibocconi.it/igier/igi/wp/2011/386.pdf
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    Cited by:

    1. Jiang-hua Fan & Yan Jing & Ren-you Zhong, 2015. "Nonemptiness and boundedness of solution sets for vector variational inequalities via topological method," Journal of Global Optimization, Springer, vol. 63(1), pages 181-193, September.

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