{"title":"矩阵重排不等式","authors":"Victoria Chayes","doi":"10.7153/mia-2021-24-30","DOIUrl":null,"url":null,"abstract":"Let $||X||_p=\\text{Tr}[(X^\\ast X)^{p/2}]^{1/p}$ denote the $p$-Schatten norm of a matrix $X\\in M_{n\\times n}(\\mathbb{C})$, and $\\sigma(X)$ the singular values with $\\uparrow$ $\\downarrow$ indicating its increasing or decreasing rearrangements. We wish to examine inequalities between $||A+B||_p^p+||A-B||_p^p$, $||\\sigma_\\downarrow(A)+\\sigma_\\downarrow(B)||_p^p+||\\sigma_\\downarrow(A)-\\sigma_\\downarrow(B)||_p^p$, and $||\\sigma_\\uparrow(A)+\\sigma_\\downarrow(B)||_p^p+||\\sigma_\\uparrow(A)-\\sigma_\\downarrow(B)||_p^p$ for various values of $1\\leq p<\\infty$. It was conjectured in [5] that a universal inequality $||\\sigma_\\downarrow(A)+\\sigma_\\downarrow(B)||_p^p+||\\sigma_\\downarrow(A)-\\sigma_\\downarrow(B)||_p^p\\leq ||A+B||_p^p+||A-B||_p^p \\leq ||\\sigma_\\uparrow(A)+\\sigma_\\downarrow(B)||_p^p+||\\sigma_\\uparrow(A)-\\sigma_\\downarrow(B)||_p^p$ might hold for $1\\leq p\\leq 2$ and reverse at $p\\geq 2$, potentially providing a stronger inequality to the generalization of Hanner's Inequality to complex matrices $||A+B||_p^p+||A-B||_p^p\\geq (||A||_p+||B||_p)^p+|||A||_p-||B||_p|^p$. We extend some of the cases in which the inequalities of [5] hold, but offer counterexamples to any general rearrangement inequality holding. We simplify the original proofs of [5] with the technique of majorization. This also allows us to characterize the equality cases of all of the inequalities considered. We also address the commuting, unitary, and $\\{A,B\\}=0$ cases directly, and expand on the role of the anticommutator. In doing so, we extend Hanner's Inequality for complex matrices to the $\\{A,B\\}=0$ case for all ranges of $p$.","PeriodicalId":49868,"journal":{"name":"Mathematical Inequalities & Applications","volume":" ","pages":""},"PeriodicalIF":0.9000,"publicationDate":"2020-09-08","publicationTypes":"Journal Article","fieldsOfStudy":null,"isOpenAccess":false,"openAccessPdf":"","citationCount":"6","resultStr":"{\"title\":\"Matrix rearrangement inequalities revisited\",\"authors\":\"Victoria Chayes\",\"doi\":\"10.7153/mia-2021-24-30\",\"DOIUrl\":null,\"url\":null,\"abstract\":\"Let $||X||_p=\\\\text{Tr}[(X^\\\\ast X)^{p/2}]^{1/p}$ denote the $p$-Schatten norm of a matrix $X\\\\in M_{n\\\\times n}(\\\\mathbb{C})$, and $\\\\sigma(X)$ the singular values with $\\\\uparrow$ $\\\\downarrow$ indicating its increasing or decreasing rearrangements. We wish to examine inequalities between $||A+B||_p^p+||A-B||_p^p$, $||\\\\sigma_\\\\downarrow(A)+\\\\sigma_\\\\downarrow(B)||_p^p+||\\\\sigma_\\\\downarrow(A)-\\\\sigma_\\\\downarrow(B)||_p^p$, and $||\\\\sigma_\\\\uparrow(A)+\\\\sigma_\\\\downarrow(B)||_p^p+||\\\\sigma_\\\\uparrow(A)-\\\\sigma_\\\\downarrow(B)||_p^p$ for various values of $1\\\\leq p<\\\\infty$. It was conjectured in [5] that a universal inequality $||\\\\sigma_\\\\downarrow(A)+\\\\sigma_\\\\downarrow(B)||_p^p+||\\\\sigma_\\\\downarrow(A)-\\\\sigma_\\\\downarrow(B)||_p^p\\\\leq ||A+B||_p^p+||A-B||_p^p \\\\leq ||\\\\sigma_\\\\uparrow(A)+\\\\sigma_\\\\downarrow(B)||_p^p+||\\\\sigma_\\\\uparrow(A)-\\\\sigma_\\\\downarrow(B)||_p^p$ might hold for $1\\\\leq p\\\\leq 2$ and reverse at $p\\\\geq 2$, potentially providing a stronger inequality to the generalization of Hanner's Inequality to complex matrices $||A+B||_p^p+||A-B||_p^p\\\\geq (||A||_p+||B||_p)^p+|||A||_p-||B||_p|^p$. We extend some of the cases in which the inequalities of [5] hold, but offer counterexamples to any general rearrangement inequality holding. We simplify the original proofs of [5] with the technique of majorization. This also allows us to characterize the equality cases of all of the inequalities considered. We also address the commuting, unitary, and $\\\\{A,B\\\\}=0$ cases directly, and expand on the role of the anticommutator. In doing so, we extend Hanner's Inequality for complex matrices to the $\\\\{A,B\\\\}=0$ case for all ranges of $p$.\",\"PeriodicalId\":49868,\"journal\":{\"name\":\"Mathematical Inequalities & Applications\",\"volume\":\" \",\"pages\":\"\"},\"PeriodicalIF\":0.9000,\"publicationDate\":\"2020-09-08\",\"publicationTypes\":\"Journal Article\",\"fieldsOfStudy\":null,\"isOpenAccess\":false,\"openAccessPdf\":\"\",\"citationCount\":\"6\",\"resultStr\":null,\"platform\":\"Semanticscholar\",\"paperid\":null,\"PeriodicalName\":\"Mathematical Inequalities & Applications\",\"FirstCategoryId\":\"100\",\"ListUrlMain\":\"https://doi.org/10.7153/mia-2021-24-30\",\"RegionNum\":4,\"RegionCategory\":\"数学\",\"ArticlePicture\":[],\"TitleCN\":null,\"AbstractTextCN\":null,\"PMCID\":null,\"EPubDate\":\"\",\"PubModel\":\"\",\"JCR\":\"Q2\",\"JCRName\":\"MATHEMATICS\",\"Score\":null,\"Total\":0}","platform":"Semanticscholar","paperid":null,"PeriodicalName":"Mathematical Inequalities & Applications","FirstCategoryId":"100","ListUrlMain":"https://doi.org/10.7153/mia-2021-24-30","RegionNum":4,"RegionCategory":"数学","ArticlePicture":[],"TitleCN":null,"AbstractTextCN":null,"PMCID":null,"EPubDate":"","PubModel":"","JCR":"Q2","JCRName":"MATHEMATICS","Score":null,"Total":0}
Let $||X||_p=\text{Tr}[(X^\ast X)^{p/2}]^{1/p}$ denote the $p$-Schatten norm of a matrix $X\in M_{n\times n}(\mathbb{C})$, and $\sigma(X)$ the singular values with $\uparrow$ $\downarrow$ indicating its increasing or decreasing rearrangements. We wish to examine inequalities between $||A+B||_p^p+||A-B||_p^p$, $||\sigma_\downarrow(A)+\sigma_\downarrow(B)||_p^p+||\sigma_\downarrow(A)-\sigma_\downarrow(B)||_p^p$, and $||\sigma_\uparrow(A)+\sigma_\downarrow(B)||_p^p+||\sigma_\uparrow(A)-\sigma_\downarrow(B)||_p^p$ for various values of $1\leq p<\infty$. It was conjectured in [5] that a universal inequality $||\sigma_\downarrow(A)+\sigma_\downarrow(B)||_p^p+||\sigma_\downarrow(A)-\sigma_\downarrow(B)||_p^p\leq ||A+B||_p^p+||A-B||_p^p \leq ||\sigma_\uparrow(A)+\sigma_\downarrow(B)||_p^p+||\sigma_\uparrow(A)-\sigma_\downarrow(B)||_p^p$ might hold for $1\leq p\leq 2$ and reverse at $p\geq 2$, potentially providing a stronger inequality to the generalization of Hanner's Inequality to complex matrices $||A+B||_p^p+||A-B||_p^p\geq (||A||_p+||B||_p)^p+|||A||_p-||B||_p|^p$. We extend some of the cases in which the inequalities of [5] hold, but offer counterexamples to any general rearrangement inequality holding. We simplify the original proofs of [5] with the technique of majorization. This also allows us to characterize the equality cases of all of the inequalities considered. We also address the commuting, unitary, and $\{A,B\}=0$ cases directly, and expand on the role of the anticommutator. In doing so, we extend Hanner's Inequality for complex matrices to the $\{A,B\}=0$ case for all ranges of $p$.
期刊介绍:
''Mathematical Inequalities & Applications'' (''MIA'') brings together original research papers in all areas of mathematics, provided they are concerned with inequalities or their role. From time to time ''MIA'' will publish invited survey articles. Short notes with interesting results or open problems will also be accepted. ''MIA'' is published quarterly, in January, April, July, and October.