随机过程
概率、随机变量与随机过程 豆瓣
Probability, Random Variables and Stochastic Processes
作者:
(美)帕普里斯(Papoulis,A.)
/
(美)佩莱(Pillai,S.U.)
译者:
保铮
/
冯大政
…
出版社:
西安交通大学出版社
2004
- 9
《概率、随机变量与随机过程》是美国著名学者A·帕普里斯教授所著的一本经典教材。自1965年第1版问世以来至今已第4版,一直被美国多所大学用作相关专业的研究生教材。它的特点是将高深的理论恰当地应用于工程实际,因而深受工程界专业人士的青睐。本书(第4版)在保持前三版风格和精华的基础上作了大量的修订:更新了约三分之一的章节内容,包括几个新的专题和新增的第15、16章,增加了大量的新例子,进一步澄清了一些复杂的概念,使读者能更容易地理解它们。
本书可供无线电通信系统、信号处理、控制理论、优化、滤波等专业的研究生和本科高年级学生使用,也可供相关领域的科开人员和工程技术人员参考。
本书可供无线电通信系统、信号处理、控制理论、优化、滤波等专业的研究生和本科高年级学生使用,也可供相关领域的科开人员和工程技术人员参考。
概率 豆瓣
作者:
[俄]施利亚耶夫
译者:
周概容
出版社:
高等教育出版社
2008
- 1
《概率(第2卷)(修订和补充第3版)》是俄国著名数学家A.H.施利亚耶夫的力作。施利亚耶夫是现代概率论奠基人、前苏联科学院院士、著名数学家A.H.柯尔莫戈洛夫的学生,在概率统计界和金融数学界影响极大。《概率(第2卷)(修订和补充第3版)》作为莫斯科大学最为出色的概率教材之一。分为一、二两卷,并配有习题集。第二卷《概率(第2卷)(修订和补充第3版)》是离散时间随机过程(随机序列)的内容。重点讲述(强和弱)平稳序列、鞅和马尔可夫链,并给出了随机序列中的估计和过滤问题、随机金融数学、保险理论和最优停时问题等领域的应用。书后附有概率的数学理论形成的简史。在图书文献资料中,指出了所引用结果的出处,并且给出了注释。此外,还列出了相应的补充文献资料。第一卷《概率(第2卷)(修订和补充第3版)》是初等概率论的内容,可以作为初步了解概率论学科的教材。大部分内容涉及以柯尔莫戈洛夫公理化体系为基础的初等概率论、概率论的数学基础、概率测度的收敛性和极限定理等基本问题。
Stochastic Processes 豆瓣
作者:
Sheldon M. Ross
出版社:
John Wiley & Sons
1996
- 4
A nonmeasure theoretic introduction to stochastic processes. Considers its diverse range of applications and provides readers with probabilistic intuition and insight in thinking about problems. This revised edition contains additional material on compound Poisson random variables including an identity which can be used to efficiently compute moments; a new chapter on Poisson approximations; and coverage of the mean time spent in transient states as well as examples relating to the Gibb's sampler, the Metropolis algorithm and mean cover time in star graphs. Numerous exercises and problems have been added throughout the text.
应用随机过程 豆瓣
Introduction to Probability Models
作者:
Sheldon M.Ross
译者:
龚光鲁
出版社:
人民邮电出版社
2007
《应用随机过程概率模型导论》是一部经典的随机过程著作, 叙述深入浅出、涉及面广,主要内容有随机变量、条件概率及条件期望、离散及连续马尔可夫链、指数分布、泊松过程、布朗运动及平稳过程、更新理论及排队论等;也包括了随机过程在物理、生物、运筹、网络、遗传、经济、保险、金融及可靠性中的应用,特别是有关随机模拟的内容, 给随机系统运行的模拟计算提供了有力的工具。《应用随机过程概率模型导论》有约700道习题, 其中带星号的习题还提供了解答。
概率论与随机过程中的泛函分析(影印版) 豆瓣
作者:
博布罗斯基
出版社:
高等教育出版社
2008
- 3
本书主要包含国外反映近代数学发展的纯数学与应用数学方面的优秀书籍,天元基金邀请国内各个方向的知名数学家参与选题的工作,经专家遴选、推荐而出版。
目录
Preface
1 Preliminaries, notations and conventions
1.1 Elements of topology
1.2 Measure theory
1.3 Functions of bounded variation. Riemann-Stieltjes integral
1.4 Sequences of independent random variables
1.5 Convex functions. Holder and Minkowski inequalities
1.6 The Cauchy equation
2 Basic notions in functional analysis
2.1 Linear spaces
2.2 Banach spaces
2.3 The space of bounded linear operators
3 Conditional expectation
3.1 Projections in Hilbert spaces
3.2 Definition and existence of conditional expectation
3.3 Properties and examples
3.4 The Radon-Nikodym Theorem
3.5 Examples of discrete martingales
3.6 Convergence of self-adjoint operators
3.7 ... and of martingales
4 Brownian motion and l-Iilbert spaces
4.1 Gaussian families & the definition of Brownian motion
4.2 Complete orthonormal sequences in a Hilbert space
4.3 Construction and basic properties of Brownian motion
4.4 Stochastic integrals
5 Dual spaces and convergence of probability measures
5.1 The Hahn-Banach Theorem
5.2 Form of linear functionals in specific Banach spaces
5.3 Thedual of an operator
5.4 Weak and weak* topologies
5.5 The Central Limit Theorem
5.6 Weak convergence in metric spaces
5.7 Compactness everywhere
5.8 Notes on other modes of convergence
6 The Gelfand transform and its applications
6.1 Banach algebras
6.2 The Gelfand transform
6.3 Examples of Gelfand transform
6.4 Examples of explicit calculations of Gelfand transform
6.5 Dense subalgebras of C(S)
6.6 Inverting the abstract Fourier transform
6.7 The Factorization Theorem
7 Semigroups of operators and Levy processes
7.1 The Banach-Steinhaus Theorem
7.2 Calculus of Banach space valued functions
7.3 Closed operators
7.4 Semigroups of operators
7.5 Brownian motion and Poisson process semigroups
7.6 More convolution semigroups
7.7 The telegraph process semigroup
7.8 Convolution semigroups of measures on semigroups
8 Markov processes and semigroups of operators
8.1 Semigroups of operators related to Markov processes
8.2 The Hille-Yosida Theorem
8.3 Generators of stochastic processes
8.4 Approximation theorems
9 Appendixes
9.1 Bibliographical notes
9.2 Solutions and hints to exercises
9.3 Some commonly used notations
References
Index
目录
Preface
1 Preliminaries, notations and conventions
1.1 Elements of topology
1.2 Measure theory
1.3 Functions of bounded variation. Riemann-Stieltjes integral
1.4 Sequences of independent random variables
1.5 Convex functions. Holder and Minkowski inequalities
1.6 The Cauchy equation
2 Basic notions in functional analysis
2.1 Linear spaces
2.2 Banach spaces
2.3 The space of bounded linear operators
3 Conditional expectation
3.1 Projections in Hilbert spaces
3.2 Definition and existence of conditional expectation
3.3 Properties and examples
3.4 The Radon-Nikodym Theorem
3.5 Examples of discrete martingales
3.6 Convergence of self-adjoint operators
3.7 ... and of martingales
4 Brownian motion and l-Iilbert spaces
4.1 Gaussian families & the definition of Brownian motion
4.2 Complete orthonormal sequences in a Hilbert space
4.3 Construction and basic properties of Brownian motion
4.4 Stochastic integrals
5 Dual spaces and convergence of probability measures
5.1 The Hahn-Banach Theorem
5.2 Form of linear functionals in specific Banach spaces
5.3 Thedual of an operator
5.4 Weak and weak* topologies
5.5 The Central Limit Theorem
5.6 Weak convergence in metric spaces
5.7 Compactness everywhere
5.8 Notes on other modes of convergence
6 The Gelfand transform and its applications
6.1 Banach algebras
6.2 The Gelfand transform
6.3 Examples of Gelfand transform
6.4 Examples of explicit calculations of Gelfand transform
6.5 Dense subalgebras of C(S)
6.6 Inverting the abstract Fourier transform
6.7 The Factorization Theorem
7 Semigroups of operators and Levy processes
7.1 The Banach-Steinhaus Theorem
7.2 Calculus of Banach space valued functions
7.3 Closed operators
7.4 Semigroups of operators
7.5 Brownian motion and Poisson process semigroups
7.6 More convolution semigroups
7.7 The telegraph process semigroup
7.8 Convolution semigroups of measures on semigroups
8 Markov processes and semigroups of operators
8.1 Semigroups of operators related to Markov processes
8.2 The Hille-Yosida Theorem
8.3 Generators of stochastic processes
8.4 Approximation theorems
9 Appendixes
9.1 Bibliographical notes
9.2 Solutions and hints to exercises
9.3 Some commonly used notations
References
Index
马尔可夫链:模型、算法与应用 豆瓣
《马尔可夫链:模型、算法与应用 应用数学译丛》讲述了马尔可夫链模型在排队系统、网页重要性排名、制造系统、再制造系统、库存系统以及金融风险管理等方面的最新应用进展.全书共安排8章内容,第1章介绍马尔可夫链、隐马尔可夫模型和马尔可夫决策过程的基本理论和方法,其余7章分别介绍马尔可夫链模型在不同领域中的应用. 《马尔可夫链:模型、算法与应用 应用数学译丛》可作为自动化、工业工程、统计学、应用数学以及管理学等专业高年级本科生或研究生的专业课教材,也可作为相关领域的研究人员及工程技术人员的参考书.