Three kinds of numerical indices of \(l_p\)-spaces

Pub Date : 2022-06-28 DOI:10.3336/gm.57.1.04
Sung Guen Kim
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Abstract

In this paper, we investigate the polynomial numerical index \(n^{(k)}(l_p),\) the symmetric multilinear numerical index \(n_s^{(k)}(l_p),\) and the multilinear numerical index \(n_m^{(k)}(l_p)\) of \(l_p\) spaces, for \(1\leq p\leq \infty.\) First we prove that \(n_{s}^{(k)}(l_1)=n_{m}^{(k)}(l_1)=1,\) for every \(k\geq 2.\) We show that for \(1 \lt p \lt \infty,\) \(n_I^{(k)}(l_p^{j+1})\leq n_I^{(k)}(l_p^j),\) for every \(j\in \mathbb{N}\) and \(n_I^{(k)}(l_p)=\lim_{j\to \infty}n_I^{(k)}(l_p^j),\) for every \(I=s, m,\) where \(l_p^j=(\mathbb{C}^j, \|\cdot\|_p)\) or \((\mathbb{R}^j, \|\cdot\|_p).\) We also show the following inequality between \( n_s^{(k)}(l_p^j)\) and \(n^{(k)}(l_p^j)\): let \(1 \lt p \lt \infty\) and \(k\in \mathbb{N}\) be fixed. Then \[ c(k: l_p^j)^{-1}~n^{(k)}(l_p^j)\leq n_s^{(k)}(l_p^j)\leq n^{(k)}(l_p^j), \] for every \(j\in \mathbb{N}\cup\{\infty\},\) where \(l_p^{\infty}:=l_p,\) \[ c(k: l_p)=\inf\Big\{M>0: \|\check{Q}\|\leq M\|Q\|,\mbox{ for every}~Q\in {\mathcal P}(^k l_p)\Big\} \] and \(\check{Q}\) denotes the symmetric \(k\)-linear form associated with \(Q.\) From this inequality, we deduce that if \(l_{p}\) is a complex space, then \(\lim_{j\to \infty} n_s^{(j)}(l_p)=\lim_{j\to \infty} n_m^{(j)}(l_p)=0,\) for every \(1\lt p \lt \infty.\)
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\(l_p\) -空间的三种数值指标
本文研究了多项式数值指标 \(n^{(k)}(l_p),\) 对称多线性数值指标\(n_s^{(k)}(l_p),\) 以及多线性数值指标 \(n_m^{(k)}(l_p)\) 的 \(l_p\) 空间,用于 \(1\leq p\leq \infty.\) 首先我们证明 \(n_{s}^{(k)}(l_1)=n_{m}^{(k)}(l_1)=1,\) 对于每一个 \(k\geq 2.\)我们为 \(1 \lt p \lt \infty,\) \(n_I^{(k)}(l_p^{j+1})\leq n_I^{(k)}(l_p^j),\) 对于每一个 \(j\in \mathbb{N}\) 和 \(n_I^{(k)}(l_p)=\lim_{j\to \infty}n_I^{(k)}(l_p^j),\) 对于每一个 \(I=s, m,\) 在哪里 \(l_p^j=(\mathbb{C}^j, \|\cdot\|_p)\) 或 \((\mathbb{R}^j, \|\cdot\|_p).\)我们还展示了下面的不等式 \( n_s^{(k)}(l_p^j)\) 和 \(n^{(k)}(l_p^j)\):让 \(1 \lt p \lt \infty\) 和 \(k\in \mathbb{N}\) 固定。然后\[c(k: l_p^j)^{-1}~n^{(k)}(l_p^j)\leq n_s^{(k)}(l_p^j)\leq n^{(k)}(l_p^j),\]对于每一个 \(j\in \mathbb{N}\cup\{\infty\},\) 在哪里\(l_p^{\infty}:=l_p,\)\[c(k: l_p)=\inf\Big\{M>0: \|\check{Q}\|\leq M\|Q\|,\mbox{ for every}~Q\in {\mathcal P}(^k l_p)\Big\}\]和 \(\check{Q}\) 表示对称 \(k\)与…相关的线性形式 \(Q.\) 由这个不等式,我们推断出如果 \(l_{p}\) 那么是复空间吗 \(\lim_{j\to \infty} n_s^{(j)}(l_p)=\lim_{j\to \infty} n_m^{(j)}(l_p)=0,\) 对于每一个 \(1\lt p \lt \infty.\)
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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