圖書信息
出版社: 清華大學出版社; 第1版 (2008年4月1日)
平裝: 309頁
正文語種: 英語
開本: 16
ISBN: 9787302167266
條形碼: 9787302167266
尺寸: 22.8 x 16.4 x 1.4 cm
重量: 381 g
作者簡介
作者:(美國)HUNG T .NGUYEN TONGHUI WANG
內容簡介
《機率統計高級教程I統計學的機率基礎》主要內容:This is an update Text book for beginning graduate students in Mathematics, Probability and Statistics, Engineering, Computer Sciences, Mathematical Economics .It distinguishes from all existing texts on the subject from its pedagogical spirit, namely, motivations before mathematics; mathematics tools are only introduced when needed and motivated .
All theoretical results are proved in a friendly fashion
Teaching the students, not only the concepts and possible applications, but also guiding the students with proof techniques
This series will help students to learn with full understanding and appreciation of the subject
It will provide interested students with solid background for research.
目錄
Preface
1 Models for Random Experiments
1.1 Games of Chance
1.2 Experiments with infinitely Many Outcomes
1.3 Structure and Properties of Probability Spaces
1.4 Conditioning and independence
1.5 Exercises
2 Models for LAWS of Random Phenomena
2.1 Discrete Sample Spaces
2.2 The Sample Space R
2.3 The Sample Space Rd
2.4 The Sample Space of Closed SETS of Rd
2.5 Exercises
3 Models for Populations
3.1 Random Elements
3.2 Distributions of Random Elements
3.3 Some Descriptive Quantities of Random Variables/Integration
3.3.1 The concept of expectation of random variables
3.3.2 Properties of expectation
3.3.3 Computations of expectation
3.3.4 The Choquet integral and random sets
3.4 Independence and Conditional Distributions
3.5 Exercises
4 Some Distribution Theory
4.1 The Method of Transformations
4.2 The Method cf Convolution
4.3 Generating Functions
4.4 Characteristic Functions
4.5 Exercites
5 Convergence Concepts
5.1 Convergence cf Random Elements
5.2 Convergence cf Moments
5.3 Convergence of Distributions
5.4 Convergence cf Probability Measures
5.5 Exercises
6 Some Limit Theorems For Large Sample Statistics
6.1 Laws of Large Numbers
6.1.1 Independent random variables
6.1.2 Independent and identically distributed random variables
6.1.3 Some examples
6.1.4 Uniform laws of large numbers*
6.2 Central Limit Theorem
6.2.1 Independent and identically distributed random variables
6.2.2 Independent random variables
6.3 Large deviations*
6.3.1 Some motivations
6.3.2 Formulation of large deviations principles
6.3.3 Large deviations techniques
6.4 Exercises
7 Conditional Expectation and Martingales
7.1 The Discrete Case
7.2 The General Case
7.3 Properties of Conditional Expectation
7.4 Martingales
7.5 Exercises
Bibliography
Index