高維隨機矩陣的譜理論及其在無綫通信和金融統計中的應用（全英文） pdf epub mobi txt 電子書 下載 2025

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☆☆☆☆☆

白誌東，方兆本，梁應敞 著

圖書標籤:

• Random Matrix Theory
• Spectral Theory
• High-Dimensional Statistics
• Wireless Communication
• Financial Statistics
• Asymptotic Analysis
• Probability
• Mathematical Finance
• Signal Processing
• Information Theory

齣版社： 中國科學技術大學齣版社

ISBN：9787312022746

版次：1

商品編碼：10339430

包裝：平裝

開本：16開

齣版時間：2009-06-01

用紙：膠版紙

頁數：231

字數：260000

內容簡介

本書講述瞭隨機矩陣譜理論的主要結果和前瞻研究，以及它在無綫通信和現代金融風險理論中的應用。書中前麵講解基本知識，後麵分析重要範例，全麵介紹瞭隨機矩陣譜理論在這兩個領域中的成果。本書對其他需要高維數據分析的領域，能起到示範作用。本書可作為統計學、計算機科學、現代物理、量子力學、無綫通信、金融工程、經濟學等領域本科生、研究生和工程技術人員學習隨機矩陣理論的重要參考資料。

目錄

Preface of Alumnis Serials
Preface
1 Introduction
1.1 History of RMT and Current Development
1.1.1 A Brief Review of RMT
1.1.2 Spectral Analysis of Large Dimensional Random Matrices
1.1.3 Limits of Extreme Eigenvalues
1.1.4 Convergence Rate of ESD
1.1.5 Circular Law
1.1.6 Central Limit Theory （CLT） of Linear Spectral Statistics
1.1.7 Limiting Distributions of Extreme Eigenvalues and Spacings
1.2 Applications to Wireless Communications
1.3 Applications to Finance Statistics
2 Limiting Spectral Distributions
2.1 Semi-circular Law
2.1.1 The lid Case
2.1.2 Independent but not Identically Distributed
2.2 Marcenko-Pastur Law
2.2.1 MP Law for lid Case
2.2.2 Generalization to the Non-lid Case
2.2.3 Proof of Theorem 2.11 by Stieltjes Transform
2.3 LSD of Products
2.3.1 Existence of the ESD of SnTn
2.3.2 Truncation of the ESD of Tn
2.3.3 Truncation， Centralization and Rescaling of the X-variables
2.3.4 Sketch of the Proof of Theorem 2.12
2.3.5 LSD of F Matrix
2.3.6 Sketch of the Proof of Theorem 2.14
2.3.7 When T is a Wigner Matrix
2.4 Hadamard Product 4
2.4.1 Truncation and Centralization
2.4.2 Outlines of Proof of the theorem
2.5 Circular Law
2.5.1 Failure of Techniques Dealing with Hermitian Matrices
2.5.2 Revisit of Stieltjes Transformation
2.5.3 A Partial Answer to the Circular Law
2.5.4 Comments and Extensions of Theorem 2.33
3 Extreme Eigenvalues
3.1 Wigner Matrix
3.2 Sample Covariance Matrix
3.2.1 Spectral Radius
3.3 Spectrum Separation
3.4 Tracy-Widom Law
3.4.1 TW Law for Wigner Matrix
3.4.2 TW Law for Sample Covariance Matrix
4 CLT of LSS
4.1 Motivation and Strategy
4.2 CLT of LSS for Wigner Matrix
4.2.1 Outlines of the Proof
4.3 CLT of LSS for Sample Covariance Matrices
4.4 F Matrix
4.4.1 Decomposition of Xnf
4.4.2 Limiting Distribution of X+nf
4.4.3 Limiting Distribution of Xnf
5 Limiting Behavior of Eigenmatrix of Sample Covariance Matrix
5.1 Earlier Work by Silverstein
5.2 Further Extension of Silversteins Work
5.3 Projecting the Eigenmatrix to a d-Dimensional Space
5.3.1 Main Results
5.3.2 Sketch of Proof of Theorem 5.19
5.3.3 Proof of Corollary 5.23
6 Applications to Wireless Communications
6.1 Introduction
6.2 Channel Models.
6.2.1 Basics of Wireless Communication Systems
……
7 Limiting Performances of Linear and Iterative Receivers
8 Applications to Finace Statistics
References
Index

前言/序言

以下是一份關於一本虛構的、不涉及“高維隨機矩陣的譜理論及其在無綫通信和金融統計中的應用”的圖書的詳細簡介。 --- 圖書簡介：《跨越古今：中世紀歐洲社會結構、信仰與日常生活的深度剖析》 作者： [此處留空，或使用一個虛構的學者姓名] 齣版社： [虛構齣版社名稱] 字數： 約1500字 --- 引言：探尋被遺忘的時代基石 中世紀，一個橫跨近韆年（約公元500年至1500年）的曆史時期，常被誤解為停滯不前的“黑暗時代”。然而，對這一時期的深入研究揭示瞭一個復雜、充滿活力且結構嚴謹的社會。本書旨在徹底摒棄陳舊的刻闆印象，通過對考古學發現、拉丁文及地方方言文獻的細緻解讀，構建一幅關於中世紀歐洲社會結構、精神生活和普通民眾日常經驗的宏大而精微的圖景。 本書的核心目標是揭示中世紀社會是如何在宗教信仰的強力塑造下，構建起從國王到農奴的層級秩序，以及這種秩序如何在莊園經濟、城市復興和技術革新的浪潮中不斷演變和適應。我們不僅關注宮廷和教會的宏大敘事，更緻力於重構那些被曆史長河淹沒的普通人的聲音、他們的恐懼、希望與生存智慧。 第一部分：社會結構的構建與權力軸心 本部分深入剖析瞭塑造中世紀社會形態的“三元結構”：祈禱者（Oratores）、戰鬥者（Bellatores）和勞動者（Laboratores）。 第一章：神權與王權——雙重權威的張力與共存。 我們將探討教皇權（Papacy）與世俗君主權（Monarchy）之間復雜的關係。從查理曼帝國的加冕到“授職權之爭”，權力並非單嚮流動，而是處於持續的協商與衝突之中。本章將細緻分析教會如何通過對聖禮的壟斷、修道院網絡的擴張以及對異端的界定，滲透到社會生活的每一個角落，並成為無可爭議的道德仲裁者。同時，我們將考察封建采邑製度（Feudalism）如何作為一種軍事和土地契約，將鬆散的政治實體粘閤在一起。 第二章：莊園經濟的微觀運作與勞役的形態。 本章將視角轉嚮支撐整個上層建築的經濟基礎——莊園（Manor）。我們不再將農奴僅僅視為被壓迫的群體，而是通過分析《莊園記錄》（Manorial Rolls）和現存的莊園布局，重構中世紀農民的實際生活條件。重點分析“勞役”（Corvée）的不同形式，如“領主周”與“季節性租藉”，以及農民如何通過集體談判、逃跑到城市或甚至通過“贖買自由”來爭取有限的自主權。本章對不同時期（早中世紀的自給自足與中世紀晚期嚮貨幣經濟的過渡）的莊園製度進行瞭細緻的比較研究。 第三章：騎士階層與榮譽規範的形成。 騎士不再僅僅是武裝的農民，而是一個具有自我意識的社會階層。本章探究“騎士精神”（Chivalry）的演變——從早期的軍事精英，如何逐漸被文學、宮廷禮儀和教會規範（如“上帝的和平”運動）所塑造，成為文化和道德的標杆。對“騎士傳說”的文本分析，揭示瞭其內部對暴力、忠誠與基督教美德的復雜平衡。 第二部分：信仰、心智與日常體驗 中世紀人的世界觀是高度宗教化的。本部分緻力於理解信仰如何構建瞭他們的宇宙觀、時間感和倫理判斷。 第四章：從天堂到地獄——中世紀的宇宙論與時間觀。 本書認為，理解中世紀必須理解他們對永恒的關注勝過對現世的關注。本章詳細闡述瞭教會如何通過禮拜日（Liturgical Calendar）來組織世俗生活的時間，將農耕周期與聖徒紀念日交織在一起。對中世紀“末世論”（Eschatology）的考察，揭示瞭對審判日和煉獄的集體焦慮如何影響瞭個體的行為模式和社會秩序的維護。 第五章：疾病、奇跡與民間療法。 麵對瘟疫、飢荒和無法解釋的痛苦，中世紀人訴諸於多種應對機製。本章對比瞭教會提供的“聖物崇拜”與“朝聖”作為集體療愈儀式，與地方流傳的草藥知識和巫術實踐。通過分析地方教區的記錄和口述傳統（已轉寫），我們展現瞭官方教義與民間信仰之間微妙的、常常是相互藉用的關係。 第六章：城市中心的興起與市民文化的萌芽。 隨著商業的復蘇（約公元11世紀後），城市成為社會動態變化的前沿陣地。本章研究行會（Guilds）的功能——它們不僅僅是經濟組織，更是社會福利網絡、職業培訓中心和政治遊說團體。對城市法典（Charters）的研究，揭示瞭市民階層如何通過集體自治，為後世的政治參與形式奠定瞭基礎，這標誌著勞動者（Laboratores）內部首次齣現顯著的階層分化。 第三部分：知識的傳播與文化轉型 中世紀並非知識的死水潭，而是知識被保存、整閤與創新的關鍵時期。 第七章：修道院的知識寶庫與手抄本的藝術。 本章探討瞭修道院在保存古典遺産中的核心作用，重點分析瞭抄寫室（Scriptorium）的工作流程和知識篩選標準。同時，我們將審視早期大學（如博洛尼亞和巴黎大學）的建立，它們如何從教會的附屬機構成長為獨立的知識中心，並催生瞭經院哲學（Scholasticism）這一重要的思想方法論。 第八章：法律的編纂與羅馬法的影響。 從查士丁尼法典的重新發現到格拉提安的《教會法匯編》，法律的理性化是中世紀後期的重要趨勢。本章分析瞭羅馬法原則如何被重新引入，並與日耳曼習慣法和教會法相互滲透，為現代歐洲法律體係的形成提供瞭至關重要的藍圖。 結論：中世紀的遺産與現代性的遠見 本書的結論部分總結道，中世紀並非一段真空期，而是孕育瞭現代民族國傢、資本主義萌芽、大學製度和西方人倫理框架的熔爐。通過對社會、信仰和日常生活的全麵考察，我們能夠更清晰地認識到，我們所繼承的西方文明的許多基礎，正是在那個被簡單概括的“中古時代”被堅定地鑄就的。 --- 本書特色： 多源材料整閤： 結閤考古學、地層學證據與文本分析，提供跨學科的論證。 微觀視角聚焦： 強調普通人的能動性，而非僅僅關注君主和教皇的行動。 概念辨析清晰： 對“封建主義”、“騎士精神”等核心概念進行嚴謹的曆史語境化界定。 本書是曆史學、社會學、文化人類學及神學研究者的必備參考書，也為對歐洲曆史有濃厚興趣的廣大讀者提供瞭一扇深入瞭解那個充滿矛盾與創造力的時代的窗口。

評分☆☆☆☆☆

The application-driven aspect of this book, specifically its focus on wireless communications and financial statistics, is what truly sets it apart for me. It’s one thing to grasp abstract mathematical theories, but it’s another entirely to see them directly inform and solve critical problems in these highly dynamic and data-intensive fields. For wireless communications, I can envision chapters delving into how random matrix theory can be used to analyze the performance of large-scale MIMO (Multiple-Input Multiple-Output) systems. This might involve understanding signal-to-noise ratios, channel capacity, and the impact of interference in scenarios with a vast number of antennas and users. The ability to model and predict the behavior of such complex communication channels using rigorous mathematical tools is invaluable. Similarly, in financial statistics, the book likely explores applications in risk management, portfolio optimization, and detecting market anomalies. The inherent randomness and high dimensionality of financial markets make them a prime candidate for random matrix theory. I’m particularly keen to learn how spectral properties can reveal underlying structures in correlation matrices, identify systemic risks, or even predict the emergence of financial crises. The transition from pure theory to practical problem-solving, as suggested by the title, is a strong draw, promising insights that are both intellectually stimulating and practically relevant.

評分☆☆☆☆☆

Having browsed through academic texts before, I can appreciate the challenge of presenting complex topics like high-dimensional random matrix theory in an accessible yet thorough manner. This book, judging by its ambitious scope, appears to aim for that delicate balance. I anticipate a structured approach, perhaps beginning with a clear introduction to the fundamental concepts of probability theory and linear algebra that form the bedrock of random matrix theory. Following this, I expect a systematic exploration of various random matrix models, with detailed derivations of their spectral properties. The "high-dimensional" aspect suggests a strong emphasis on asymptotic analysis, where the behavior of matrices as their dimensions tend to infinity is investigated. This is a critical area, as many real-world applications involve matrices that are far larger than what can be precisely analyzed. I’m looking forward to understanding the mathematical machinery used to derive these asymptotic results, which might include powerful techniques like free probability, Stieltjes transforms, and determinantal point processes. The book’s focus on applications in wireless communications and financial statistics implies that these theoretical concepts will be directly connected to concrete examples and case studies, illustrating how spectral properties can be leveraged to gain meaningful insights into these domains.

評分☆☆☆☆☆

From what I understand, this book aims to bridge the gap between the abstract mathematical framework of random matrix theory and its concrete manifestations in cutting-edge technological and economic sectors. The "spectral theory" aspect implies a deep dive into the mathematical underpinnings of how the eigenvalues and eigenvectors of large, randomly generated matrices behave. I expect a rigorous development of theorems and proofs, meticulously laid out to guide the reader through the complexities of high-dimensional probability and linear algebra. The fact that it specifically targets applications in wireless communications and financial statistics suggests that the theoretical discussions will be directly motivated by the challenges and opportunities within these domains. For instance, in wireless communications, one might expect to see how random matrix theory helps in understanding the capacity of wireless channels, the design of robust communication systems, or the analysis of interference in dense networks. In financial statistics, the applications could range from portfolio optimization and risk management to the detection of market patterns and the analysis of complex financial instruments. The book likely provides a detailed exploration of how spectral properties, such as the Marchenko-Pastur law or Tracy-Widom distributions, find practical utility in these application areas, offering quantitative insights and predictive capabilities.

評分☆☆☆☆☆

The reputation of the authors and the potential for this book to become a definitive resource in its field is a significant factor in my interest. Spectral theory, especially when applied to high-dimensional random matrices, is a sophisticated area of mathematics with profound implications. This title suggests a comprehensive treatment that could potentially consolidate existing knowledge and introduce new perspectives. I envision the book starting with a historical overview of random matrix theory, perhaps tracing its origins in nuclear physics and its subsequent expansion into various scientific disciplines. The core of the book, I presume, will be a rigorous exposition of the spectral theory itself, covering topics such as the eigenvalue distributions for different types of random matrices (e.g., Gaussian, Wishart, non-Hermitian ensembles), the properties of eigenvectors, and the behavior of spectral statistics like extreme eigenvalues and level spacing. The emphasis on "high-dimensional" is key, indicating a focus on asymptotic regimes where traditional analytical methods may fail. I'm particularly interested in how the book addresses the universality of spectral distributions, a fascinating phenomenon where the statistical properties of eigenvalues become independent of the specific distribution of the matrix entries under certain conditions. The dual focus on applications in wireless communications and financial statistics suggests that the book will not only delve into the theoretical intricacies but also provide practical tools and insights for researchers and practitioners in these fields.

評分☆☆☆☆☆

I've always been fascinated by the sheer potential of large, complex datasets, and this book, "Spectral Theory of High-Dimensional Random Matrices and its Applications in Wireless Communications and Financial Statistics," promised a deep dive into a fundamental mathematical framework. From what I’ve gathered, it seems to tackle the intricate world of random matrix theory, specifically focusing on scenarios where the dimensionality of the matrices becomes exceedingly large. This immediately piqued my interest, as it directly addresses the increasing scale of data we encounter in modern scientific and technological fields. The title suggests a rigorous exposition of the spectral properties – eigenvalues, eigenvectors, and their distributions – of these high-dimensional random matrices. I imagine the text would carefully build the theoretical foundations, perhaps starting with simpler models like the Wigner and GOE ensembles and then progressing to more complex ones relevant to practical applications. The mention of "spectral theory" implies a significant emphasis on analytical tools and mathematical rigor, which is exactly what I'm looking for to truly understand the underlying principles. It’s not just about the results, but the journey of deriving them. I anticipate sections dedicated to limit theorems, convergence properties, and the asymptotic behavior of spectral statistics, perhaps including discussions on universality phenomena. The comprehensive nature suggested by the title also leads me to believe that it would cover various types of random matrix ensembles, possibly including those with structured entries or non-Gaussian distributions, all crucial for modeling diverse real-world phenomena. The prospect of understanding how these abstract mathematical concepts translate into tangible insights is incredibly exciting.

評分☆☆☆☆☆

還是很不錯的圖書，具有針對性！

評分☆☆☆☆☆

要是更便宜點就好瞭！

評分☆☆☆☆☆

還是很不錯的圖書，具有針對性！

評分☆☆☆☆☆

不過還是有一定難度的。

評分☆☆☆☆☆

非常經典的書 很受啓發

評分☆☆☆☆☆

還行，還不錯，值得一讀，閑時看看

評分☆☆☆☆☆

書還不錯。應用方麵看瞭一下，感覺大多是列舉瞭現有的一些方案，並沒有深入地分析隨機矩陣理論的應用原理；推導分析過程也不夠豐富。

評分☆☆☆☆☆

還行，還不錯，值得一讀，閑時看看

評分☆☆☆☆☆

書很薄，價格很貴，內容不簡單……