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Mathematical Models of Information and Stochastic Systems 1st Edition by Philipp Kornreich ISBN 9781351835046 1351835041

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Mathematical Models of Information and Stochastic Systems 1st Edition Philipp Kornreich Digital Instant Download

Author(s): Philipp Kornreich
ISBN(s): 9781420058840, 1420058843
Edition: 1
File Details: PDF, 11.34 MB
Year: 2008
Language: english
SKU: EB-4767362 Category: Tag:

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ISBN 10: 1351835041
ISBN 13: 9781351835046
Author: Philipp Kornreich

From ancient soothsayers and astrologists to today’s pollsters and economists, probability theory has long been used to predict the future on the basis of past and present knowledge. Mathematical Models of Information and Stochastic Systems shows that the amount of knowledge about a system plays an important role in the mathematical models used to foretell the future of the system. It explains how this known quantity of information is used to derive a system’s probabilistic properties. After an introduction, the book presents several basic principles that are employed in the remainder of the text to develop useful examples of probability theory. It examines both discrete and continuous distribution functions and random variables, followed by a chapter on the average values, correlations, and covariances of functions of variables as well as the probabilistic mathematical model of quantum mechanics. The author then explores the concepts of randomness and entropy and derives various discrete probabilities and continuous probability density functions from what is known about a particular stochastic system. The final chapters discuss information of discrete and continuous systems, time-dependent stochastic processes, data analysis, and chaotic systems and fractals. By building a range of probability distributions based on prior knowledge of the problem, this classroom-tested text illustrates how to predict the behavior of diverse systems. A solutions manual is available for qualifying instructors.
 

Mathematical Models of Information and Stochastic Systems 1st Edition Table of contents:

Chapter 1 Introduction

1.1 Historical Development and Aspects of Probability Theory

1.2 Discussion of the Material in this Text

Reference

Chapter 2 Events and Densiy of Events

2.1 General Probability Concepts

2.2 Probabilities of Continuous Sets of Events

2.3 Discrete Events Having the Same Probability

2.4 Digression of Factorials and the Γ Function

2.5 Continuous Sets of Events Having the Same Probability, Density of States

Problems

Chapter 3 Joint, Conditional, and Total Probabilities

3.1 Conditional Probabilities

3.2 Dependent, Independent, and Exclusive Events

3.3 Total Probability and Bayes’ Theorem of Discrete Events

3.4 Markov Processes

3.5 Joint, Conditional, and Total Probabilities and Bayes’ Theorem of Continuous Events

Problems

Chapter 4 Random Variables and Functions of Random Variables

4.1 Concept of a Random Variable and Functions of a Random Variable

4.2 Discrete Distribution Functions

4.3 Discrete Distribution Functions for More Than One Value of a Random Variable with the Same Probability

4.4 Continuous Distribution and Density Functions

4.5 Continuous Distribution Functions for More Than One Value of a Random Variable with the Same Probability

4.6 Discrete Distribution Functions of Multiple Random Variables

4.7 Continuous Distribution Functions of Multiple Random Variables

4.8 Phase Space: A Special Case of Multiple Random Variables

Problems

Chapter 5 Conditional Distribution Functions and a Special Case: The Sum of Two Random Variables

5.1 Discrete Conditional Distribution Functions

5.2 Continuous Conditional Distribution Functions

5.3 A Special Case: The Sum of Two Statistically Independent Discrete Random Variables

5.4 A Special Case: The Sum of Two Statistically Independent Continuous Random Variables

Problems

Chapter 6 Average Values, Moments, and Correlations of Random Variables and of Functions of Random Variables

6.1 The Most Likely Value of a Random Variable

6.2 The Average Value of a Discrete Random Variable and of a Function of a Discrete Random Variable

6.3 An Often-Used Special Case

6.4 The Probabilistic Mathematical Model of Discrete Quantum Mechanics

6.5 The Average Value of a Continuous Random Variable and of a Function of a Continuous Random Variable

6.6 The Probabilistic Model of Continuous Quantum Mechanics

6.7 Moments of Random Variables

6.8 Conditional Average Value of a Random Variable and of a Function of a Random Variable

6.9 Central Moments

6.10 Variance and Standard Deviation

6.11 Correlations of Two Random Variables and of Functions of Random Variables

6.12 A Special Case: The Average Value of e−jkx

Reference

Problems

Chapter 7 Randomness and Average Randomness

7.1 The Concept of Randomness of Discrete Events

7.2 The Concept of Randomness of Continuous Events

7.3 The Average Randomness of Discrete Events

7.4 The Average Randomness of Continuous Random Variables

7.5 The Average Randomness of Random Variables with Values that have the Same Probability

7.6 The Entropy of Real Physical Systems and a Very Large Number

7.7 The Cepstrum

7.8 Stochastic Temperature and the Legendre Transform

7.9 Other Stochastic Potentials and The Noise Figure

Reference

Problems

Chapter 8 Most Random Systems

8.1 Methods for Determining Probabilities

8.2 Determining Probabilities Based on What is Known about a System

8.3 The Poisson Probability and One of Its Applications

8.4 Continuous Most Random Systems

8.5 Properties of Gaussian Stochastic Systems

8.6 Important Examples of Stochastic Physical Systems

8.7 The Limit of Zero and Very Large Temperatures

Reference

Problems

Chapter 9 Information

9.1 Information Concepts

9.2 Information in Genes

9.3 Information Transmission of Discrete Systems

9.4 Information Transmission of Continuous or Analog Systems

9.5 The Maximum Information and Optimum Transmission Rates of Discrete Systems

9.6 The Maximum Information and Optimum Transmission Rates of Continuous or Analog Systems

9.7 The Bit Error Rate

References

Problems

Chapter 10 Random Processes

10.1 Random Processes

10.2 Random Walk and the Famous Case of Scent Molecules Emerging from a Perfume Bottle

10.3 The Simple Stochastic Oscillator and Clocks

10.4 Correlation Functions of Random Processes

10.5 Stationarity of Random Processes

10.6 The Time Average and Ergodldty of Random Processes

10.7 Partially Coherent Light Rays as Random Processes.

10.8 Stochastic Aspects of Transitions Between States

10.9 Cantor Sets as Random Processes

References

Problems

Chapter 11 Spectral Densities

11.1 Stochastic Power

11.2 The Power Spectrum and Cross-Power Spectrum

11.3 The Effects of Filters on the Autocorrelation Function and The Power Spectral Density

11.4 The Bandwidth of The Power Spectrum

Problems

Chapter 12 Data Analysis

12.1 Least Square Differences

12.2 The Special Case of Linear Regression

12.3 Other Examples

Problems

Chapter 13 Chaotic Systems

13.1 Fractals

13.2 Mandelbrot Sets

13.3 Difference Equations

13.4 The Hénon Difference Equation

13.5 Single-Particle Single-Well Potential

References

Index

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