Extreme points of ${\mathcal L}_s(^2l_{\infty})$ and ${\mathcal P}(^2l_{\infty})$

Array

Authors

  • Sung Guen Kim Kyungpook National University, 41566, Daegu, South Korea

DOI:

https://doi.org/10.15330/cmp.13.2.289-297

Keywords:

extreme point, symmetric bilinear form, 2-homogeneous polynomials on $l_{\infty}$

Abstract

For $n\geq 2,$ we show that every extreme point of the unit ball of ${\mathcal L}_s(^2l_{\infty}^n)$ is extreme in ${\mathcal L}_s(^2l_{\infty}^{n+1})$, which answers the question in [Period. Math. Hungar. 2018, 77 (2), 274-290]. As a corollary we show that every extreme point of the unit ball of ${\mathcal L}_s(^2l_{\infty}^n)$ is extreme in ${\mathcal L}_s(^2l_{\infty})$. We also show that every extreme point of the unit ball of ${\mathcal P}(^2l_{\infty}^2)$ is extreme in ${\mathcal P}(^2l_{\infty}^n).$ As a corollary we show that every extreme point of the unit ball of ${\mathcal P}(^2l_{\infty}^2)$ is extreme in ${\mathcal P}(^2l_{\infty})$.

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Published

2021-07-24

How to Cite

(1)
Kim, S. G. Extreme Points of ${\mathcal L}_s(^2l_{\infty})$ and ${\mathcal P}(^2l_{\infty})$: Array. Carpathian Math. Publ. 2021, 13, 289-297.

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Section

Scientific articles