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Extreme and exposed points of L(^n l^2_∞ ) and L_s (^n l^2_∞)

  • Sung Guen Kim [1]
    1. [1] Kyungpook National University

      Kyungpook National University

      Corea del Sur

  • Localización: Extracta mathematicae, ISSN-e 0213-8743, Vol. 35, Nº 2, 2020, págs. 127-135
  • Idioma: inglés
  • DOI: 10.17398/2605-5686.35.2.127
  • Enlaces
  • Resumen
    • For every n ≥ 2 this paper is devoted to the description of the sets of extreme and exposed points of the closed unit balls of L(n l2∞ ) and Ls(n l2∞ ), where L(n l2∞ ) is the space of n-linear forms on R2 with the supremum norm, and Ls(n l2∞ ) is the subspace of L(n l2∞ ) consisting of symmetric n-linear forms. First we classify the extreme points of the closed unit balls of L(n l2∞ ) and Ls(n l2∞ ) correspondingly. As corollaries we obtain |ext BL(n l2∞ ) | = 2(2n) and =|ext BLs(n l2∞ ) | =2n+1. We also show that exp BL(n l2∞ ) =ext BL(n l2∞ ) and exp BLs(n l2∞ ) =ext BLs(n l2∞ ) .

  • Referencias bibliográficas
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    • [13] M.G. Krein, D.P. Milman, On extreme points of regular convex sets, Studia Math. 9 (1940), 133 – 137.

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