关于${\mathcal L}(^ml_{1}^n)$的赋范集的注释和${\mathcal L}(^3l_{1}^2)$的赋范集的描述

Q3 Mathematics
Sung Guen Kim
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Let $T=\\big(a_{i}\\big)_{1\\leq i_k\\leq n}\\in {\\mathcal L}(^ml_{1}^n)$ with $\\|T\\|=1.$Define $S=\\big(b_{i}\\big)_{1\\leq i_k\\leq n}\\in {\\mathcal L}(^n l_1^m)$ be such that $b_{i}=a_{i}$ if$|a_{i}|=1$ and $b_{i}=1$ if$|a_{i}|<1.$ \nLet $A=\\{1, \\ldots, n\\}\\times \\cdots\\times\\{1, \\ldots, n\\}$ and $M=\\{i\\in A: |a_{i}|<1\\}.$Then, \n\\centerline{$\\qopname\\relax o{Norm}(T)=\\bigcup_{(i_1, \\ldots, i_m)\\in M}\\Big\\{\\Big(\\big(t_1^{(1)}, \\ldots, t_{{i_1}-1}^{(1)}, 0, t_{{i_1}+1}^{(1)}, \\ldots, t_{n}^{(1)}\\big), \\big(t_1^{(2)}, \\ldots, t_{n}^{(2)}\\big), \\ldots, \\big(t_1^{(m)}, \\ldots, t_{n}^{(m)}\\big)\\Big),$} \n\\centerline{$\\Big(\\big(t_1^{(1)}, \\ldots, t_{n}^{(1)}\\big), \\big(t_1^{(2)}, \\ldots, t_{{i_2}-1}^{(2)}, 0, t_{{i_2}+1}^{(2)}, \\ldots, t_{n}^{(2)}\\big), \\big(t_1^{(3)}, \\ldots, t_{n}^{(3)}\\big), \\ldots, \\big(t_1^{(m)}, \\ldots, t_{n}^{(m)}\\big)\\Big),\\ldots$} \n\\centerline{$\\ldots, \\Big(\\big(t_1^{(1)}, \\ldots, t_{n}^{(1)}\\big), \\ldots, \\big(t_1^{(m-1)}, \\ldots, t_{n}^{(m-1)}\\big), \\big(t_1^{(m)}, \\ldots, t_{{i_m}-1}^{(m)}, 0, t_{{i_m}+1}^{(m)}, \\ldots, t_{n}^{(m)}\\big)\\Big)\\colon$} \n\\centerline{$ \\Big(\\big(t_1^{(1)}, \\ldots, t_{n}^{(1)}\\big), \\ldots, \\big(t_1^{(m)}, \\ldots, t_{n}^{(m)}\\big)\\Big)\\in \\qopname\\relax o{Norm}(S)\\Big\\}.$} \nThis statement extend the results of [9]. \n\\noi (b) Using the result (a), we describe the norming sets of every $T\\in {\\mathcal L}(^3l_{1}^2).$","PeriodicalId":37555,"journal":{"name":"Matematychni Studii","volume":null,"pages":null},"PeriodicalIF":0.0000,"publicationDate":"2023-01-16","publicationTypes":"Journal Article","fieldsOfStudy":null,"isOpenAccess":false,"openAccessPdf":"","citationCount":"0","resultStr":"{\"title\":\"Remarks on the norming sets of ${\\\\mathcal L}(^ml_{1}^n)$ and description of the norming sets of ${\\\\mathcal L}(^3l_{1}^2)$\",\"authors\":\"Sung Guen Kim\",\"doi\":\"10.30970/ms.58.2.201-211\",\"DOIUrl\":null,\"url\":null,\"abstract\":\"Let $n\\\\in \\\\mathbb{N}, n\\\\geq 2.$ An element $x=(x_1, \\\\ldots, x_n)\\\\in E^n$ is called a {\\\\em norming point} of $T\\\\in {\\\\mathcal L}(^n E)$ if $\\\\|x_1\\\\|=\\\\cdots=\\\\|x_n\\\\|=1$ and$|T(x)|=\\\\|T\\\\|,$ where ${\\\\mathcal L}(^n E)$ denotes the space of all continuous $n$-linear forms on $E.$For $T\\\\in {\\\\mathcal L}(^n E)$ we define the {\\\\em norming set} of $T$ \\n\\\\centerline{$\\\\qopname\\\\relax o{Norm}(T)=\\\\Big\\\\{(x_1, \\\\ldots, x_n)\\\\in E^n: (x_1, \\\\ldots, x_n)~\\\\mbox{is a norming point of}~T\\\\Big\\\\}.$} \\nBy $i=(i_1,i_2,\\\\ldots,i_m)$ we denote the multi-index. In this paper we show the following: \\n\\\\noi (a) Let $n, m\\\\geq 2$ and let $l_1^n=\\\\mathbb{R}^n$ with the $l_1$-norm. Let $T=\\\\big(a_{i}\\\\big)_{1\\\\leq i_k\\\\leq n}\\\\in {\\\\mathcal L}(^ml_{1}^n)$ with $\\\\|T\\\\|=1.$Define $S=\\\\big(b_{i}\\\\big)_{1\\\\leq i_k\\\\leq n}\\\\in {\\\\mathcal L}(^n l_1^m)$ be such that $b_{i}=a_{i}$ if$|a_{i}|=1$ and $b_{i}=1$ if$|a_{i}|<1.$ \\nLet $A=\\\\{1, \\\\ldots, n\\\\}\\\\times \\\\cdots\\\\times\\\\{1, \\\\ldots, n\\\\}$ and $M=\\\\{i\\\\in A: |a_{i}|<1\\\\}.$Then, \\n\\\\centerline{$\\\\qopname\\\\relax o{Norm}(T)=\\\\bigcup_{(i_1, \\\\ldots, i_m)\\\\in M}\\\\Big\\\\{\\\\Big(\\\\big(t_1^{(1)}, \\\\ldots, t_{{i_1}-1}^{(1)}, 0, t_{{i_1}+1}^{(1)}, \\\\ldots, t_{n}^{(1)}\\\\big), \\\\big(t_1^{(2)}, \\\\ldots, t_{n}^{(2)}\\\\big), \\\\ldots, \\\\big(t_1^{(m)}, \\\\ldots, t_{n}^{(m)}\\\\big)\\\\Big),$} \\n\\\\centerline{$\\\\Big(\\\\big(t_1^{(1)}, \\\\ldots, t_{n}^{(1)}\\\\big), \\\\big(t_1^{(2)}, \\\\ldots, t_{{i_2}-1}^{(2)}, 0, t_{{i_2}+1}^{(2)}, \\\\ldots, t_{n}^{(2)}\\\\big), \\\\big(t_1^{(3)}, \\\\ldots, t_{n}^{(3)}\\\\big), \\\\ldots, \\\\big(t_1^{(m)}, \\\\ldots, t_{n}^{(m)}\\\\big)\\\\Big),\\\\ldots$} \\n\\\\centerline{$\\\\ldots, \\\\Big(\\\\big(t_1^{(1)}, \\\\ldots, t_{n}^{(1)}\\\\big), \\\\ldots, \\\\big(t_1^{(m-1)}, \\\\ldots, t_{n}^{(m-1)}\\\\big), \\\\big(t_1^{(m)}, \\\\ldots, t_{{i_m}-1}^{(m)}, 0, t_{{i_m}+1}^{(m)}, \\\\ldots, t_{n}^{(m)}\\\\big)\\\\Big)\\\\colon$} \\n\\\\centerline{$ \\\\Big(\\\\big(t_1^{(1)}, \\\\ldots, t_{n}^{(1)}\\\\big), \\\\ldots, \\\\big(t_1^{(m)}, \\\\ldots, t_{n}^{(m)}\\\\big)\\\\Big)\\\\in \\\\qopname\\\\relax o{Norm}(S)\\\\Big\\\\}.$} \\nThis statement extend the results of [9]. \\n\\\\noi (b) Using the result (a), we describe the norming sets of every $T\\\\in {\\\\mathcal L}(^3l_{1}^2).$\",\"PeriodicalId\":37555,\"journal\":{\"name\":\"Matematychni Studii\",\"volume\":null,\"pages\":null},\"PeriodicalIF\":0.0000,\"publicationDate\":\"2023-01-16\",\"publicationTypes\":\"Journal Article\",\"fieldsOfStudy\":null,\"isOpenAccess\":false,\"openAccessPdf\":\"\",\"citationCount\":\"0\",\"resultStr\":null,\"platform\":\"Semanticscholar\",\"paperid\":null,\"PeriodicalName\":\"Matematychni Studii\",\"FirstCategoryId\":\"1085\",\"ListUrlMain\":\"https://doi.org/10.30970/ms.58.2.201-211\",\"RegionNum\":0,\"RegionCategory\":null,\"ArticlePicture\":[],\"TitleCN\":null,\"AbstractTextCN\":null,\"PMCID\":null,\"EPubDate\":\"\",\"PubModel\":\"\",\"JCR\":\"Q3\",\"JCRName\":\"Mathematics\",\"Score\":null,\"Total\":0}","platform":"Semanticscholar","paperid":null,"PeriodicalName":"Matematychni Studii","FirstCategoryId":"1085","ListUrlMain":"https://doi.org/10.30970/ms.58.2.201-211","RegionNum":0,"RegionCategory":null,"ArticlePicture":[],"TitleCN":null,"AbstractTextCN":null,"PMCID":null,"EPubDate":"","PubModel":"","JCR":"Q3","JCRName":"Mathematics","Score":null,"Total":0}
引用次数: 0

摘要

让 $n\in \mathbb{N}, n\geq 2.$ 元素 $x=(x_1, \ldots, x_n)\in E^n$ 叫做a {\em 规范点} 的 $T\in {\mathcal L}(^n E)$ 如果 $\|x_1\|=\cdots=\|x_n\|=1$ 和$|T(x)|=\|T\|,$ 在哪里 ${\mathcal L}(^n E)$ 表示所有连续的空间 $n$-线性形式 $E.$因为 $T\in {\mathcal L}(^n E)$ 我们定义 {\em 规范集} 的 $T$ \centerline{$\qopname\relax o{Norm}(T)=\Big\{(x_1, \ldots, x_n)\in E^n: (x_1, \ldots, x_n)~\mbox{is a norming point of}~T\Big\}.$} By $i=(i_1,i_2,\ldots,i_m)$ 我们表示多指标。在本文中,我们展示了以下内容: \noi (a)让 $n, m\geq 2$ 让 $l_1^n=\mathbb{R}^n$ 和 $l_1$-norm。让 $T=\big(a_{i}\big)_{1\leq i_k\leq n}\in {\mathcal L}(^ml_{1}^n)$ 有 $\|T\|=1.$定义 $S=\big(b_{i}\big)_{1\leq i_k\leq n}\in {\mathcal L}(^n l_1^m)$ 这样 $b_{i}=a_{i}$ 如果$|a_{i}|=1$ 和 $b_{i}=1$ 如果$|a_{i}|<1.$ 让 $A=\{1, \ldots, n\}\times \cdots\times\{1, \ldots, n\}$ 和 $M=\{i\in A: |a_{i}|<1\}.$然后, \centerline{$\qopname\relax o{Norm}(T)=\bigcup_{(i_1, \ldots, i_m)\in M}\Big\{\Big(\big(t_1^{(1)}, \ldots, t_{{i_1}-1}^{(1)}, 0, t_{{i_1}+1}^{(1)}, \ldots, t_{n}^{(1)}\big), \big(t_1^{(2)}, \ldots, t_{n}^{(2)}\big), \ldots, \big(t_1^{(m)}, \ldots, t_{n}^{(m)}\big)\Big),$} \centerline{$\Big(\big(t_1^{(1)}, \ldots, t_{n}^{(1)}\big), \big(t_1^{(2)}, \ldots, t_{{i_2}-1}^{(2)}, 0, t_{{i_2}+1}^{(2)}, \ldots, t_{n}^{(2)}\big), \big(t_1^{(3)}, \ldots, t_{n}^{(3)}\big), \ldots, \big(t_1^{(m)}, \ldots, t_{n}^{(m)}\big)\Big),\ldots$} \centerline{$\ldots, \Big(\big(t_1^{(1)}, \ldots, t_{n}^{(1)}\big), \ldots, \big(t_1^{(m-1)}, \ldots, t_{n}^{(m-1)}\big), \big(t_1^{(m)}, \ldots, t_{{i_m}-1}^{(m)}, 0, t_{{i_m}+1}^{(m)}, \ldots, t_{n}^{(m)}\big)\Big)\colon$} \centerline{$ \Big(\big(t_1^{(1)}, \ldots, t_{n}^{(1)}\big), \ldots, \big(t_1^{(m)}, \ldots, t_{n}^{(m)}\big)\Big)\in \qopname\relax o{Norm}(S)\Big\}.$} 这条语句扩展了[9]的结果。 \noi (b)利用(a)的结果,我们描述了每 $T\in {\mathcal L}(^3l_{1}^2).$
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Remarks on the norming sets of ${\mathcal L}(^ml_{1}^n)$ and description of the norming sets of ${\mathcal L}(^3l_{1}^2)$
Let $n\in \mathbb{N}, n\geq 2.$ An element $x=(x_1, \ldots, x_n)\in E^n$ is called a {\em norming point} of $T\in {\mathcal L}(^n E)$ if $\|x_1\|=\cdots=\|x_n\|=1$ and$|T(x)|=\|T\|,$ where ${\mathcal L}(^n E)$ denotes the space of all continuous $n$-linear forms on $E.$For $T\in {\mathcal L}(^n E)$ we define the {\em norming set} of $T$ \centerline{$\qopname\relax o{Norm}(T)=\Big\{(x_1, \ldots, x_n)\in E^n: (x_1, \ldots, x_n)~\mbox{is a norming point of}~T\Big\}.$} By $i=(i_1,i_2,\ldots,i_m)$ we denote the multi-index. In this paper we show the following: \noi (a) Let $n, m\geq 2$ and let $l_1^n=\mathbb{R}^n$ with the $l_1$-norm. Let $T=\big(a_{i}\big)_{1\leq i_k\leq n}\in {\mathcal L}(^ml_{1}^n)$ with $\|T\|=1.$Define $S=\big(b_{i}\big)_{1\leq i_k\leq n}\in {\mathcal L}(^n l_1^m)$ be such that $b_{i}=a_{i}$ if$|a_{i}|=1$ and $b_{i}=1$ if$|a_{i}|<1.$ Let $A=\{1, \ldots, n\}\times \cdots\times\{1, \ldots, n\}$ and $M=\{i\in A: |a_{i}|<1\}.$Then, \centerline{$\qopname\relax o{Norm}(T)=\bigcup_{(i_1, \ldots, i_m)\in M}\Big\{\Big(\big(t_1^{(1)}, \ldots, t_{{i_1}-1}^{(1)}, 0, t_{{i_1}+1}^{(1)}, \ldots, t_{n}^{(1)}\big), \big(t_1^{(2)}, \ldots, t_{n}^{(2)}\big), \ldots, \big(t_1^{(m)}, \ldots, t_{n}^{(m)}\big)\Big),$} \centerline{$\Big(\big(t_1^{(1)}, \ldots, t_{n}^{(1)}\big), \big(t_1^{(2)}, \ldots, t_{{i_2}-1}^{(2)}, 0, t_{{i_2}+1}^{(2)}, \ldots, t_{n}^{(2)}\big), \big(t_1^{(3)}, \ldots, t_{n}^{(3)}\big), \ldots, \big(t_1^{(m)}, \ldots, t_{n}^{(m)}\big)\Big),\ldots$} \centerline{$\ldots, \Big(\big(t_1^{(1)}, \ldots, t_{n}^{(1)}\big), \ldots, \big(t_1^{(m-1)}, \ldots, t_{n}^{(m-1)}\big), \big(t_1^{(m)}, \ldots, t_{{i_m}-1}^{(m)}, 0, t_{{i_m}+1}^{(m)}, \ldots, t_{n}^{(m)}\big)\Big)\colon$} \centerline{$ \Big(\big(t_1^{(1)}, \ldots, t_{n}^{(1)}\big), \ldots, \big(t_1^{(m)}, \ldots, t_{n}^{(m)}\big)\Big)\in \qopname\relax o{Norm}(S)\Big\}.$} This statement extend the results of [9]. \noi (b) Using the result (a), we describe the norming sets of every $T\in {\mathcal L}(^3l_{1}^2).$
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来源期刊
Matematychni Studii
Matematychni Studii Mathematics-Mathematics (all)
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1.00
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发文量
38
期刊介绍: Journal is devoted to research in all fields of mathematics.
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