Alle Infos zum eBook verschenken
- Format: ePub
- Merkliste
- Auf die Merkliste
- Bewerten Bewerten
- Teilen
- Produkt teilen
- Produkterinnerung
- Produkterinnerung
Hier können Sie sich einloggen
Bitte loggen Sie sich zunächst in Ihr Kundenkonto ein oder registrieren Sie sich bei bücher.de, um das eBook-Abo tolino select nutzen zu können.
The second edition enhanced with new chapters, figures, and appendices to cover the new developments in applied mathematical functions This book examines the topics of applied mathematical functions to problems that engineers and researchers solve daily in the course of their work. The text covers set theory, combinatorics, random variables, discrete and continuous probability, distribution functions, convergence of random variables, computer generation of random variates, random processes and stationarity concepts with associated autocovariance and cross covariance functions, estimation…mehr
- Geräte: eReader
- mit Kopierschutz
- eBook Hilfe
- Größe: 65.08MB
- Venkatarama KrishnanProbability and Random Processes (eBook, PDF)120,99 €
- John J. ShynkProbability, Random Variables, and Random Processes (eBook, ePUB)116,99 €
- John J. ShynkProbability, Random Variables, and Random Processes (eBook, PDF)116,99 €
- Ilia B. FrenkelApplied Reliability Engineering and Risk Analysis (eBook, ePUB)132,99 €
- Michael TortorellaReliability, Maintainability, and Supportability (eBook, ePUB)118,99 €
- Umberto SpagnoliniStatistical Signal Processing in Engineering (eBook, ePUB)110,99 €
- Harry SchwarzlanderProbability Concepts and Theory for Engineers (eBook, ePUB)71,99 €
-
-
-
Dieser Download kann aus rechtlichen Gründen nur mit Rechnungsadresse in A, B, BG, CY, CZ, D, DK, EW, E, FIN, F, GR, HR, H, IRL, I, LT, L, LR, M, NL, PL, P, R, S, SLO, SK ausgeliefert werden.
- Produktdetails
- Verlag: John Wiley & Sons
- Seitenzahl: 528
- Erscheinungstermin: 15. Juli 2015
- Englisch
- ISBN-13: 9781119011903
- Artikelnr.: 43420127
- Verlag: John Wiley & Sons
- Seitenzahl: 528
- Erscheinungstermin: 15. Juli 2015
- Englisch
- ISBN-13: 9781119011903
- Artikelnr.: 43420127
Sets, Fields, and Events 1 1.1 Set Definitions 1 1.2 Set Operations 2 1.3
Set Algebras, Fields, and Events 5 2 Probability Space and Axioms 7 2.1
Probability Space 7 2.2 Conditional Probability 9 2.3 Independence 11 2.4
Total Probability and Bayes' Theorem 12 3 Basic Combinatorics 16 3.1 Basic
Counting Principles 16 3.2 Permutations 16 3.3 Combinations 18 4 Discrete
Distributions 23 4.1 Bernoulli Trials 23 4.2 Binomial Distribution 23 4.3
Multinomial Distribution 26 4.4 Geometric Distribution 26 4.5 Negative
Binomial Distribution 27 4.6 Hypergeometric Distribution 28 4.7 Poisson
Distribution 30 4.8 Newton-Pepys Problem and its Extensions 33 4.9
Logarithmic Distribution 40 4.9.1 Finite Law (Benford's Law) 40 4.9.2
Infinite Law 43 4.10 Summary of Discrete Distributions 44 5 Random
Variables 45 5.1 Definition of Random Variables 45 5.2 Determination of
Distribution and Density Functions 46 5.3 Properties of Distribution and
Density Functions 50 5.4 Distribution Functions from Density Functions 51 6
Continuous Random Variables and Basic Distributions 54 6.1 Introduction 54
6.2 Uniform Distribution 54 6.3 Exponential Distribution 55 6.4 Normal or
Gaussian Distribution 57 7 Other Continuous Distributions 63 7.1
Introduction 63 7.2 Triangular Distribution 63 7.3 Laplace Distribution 63
7.4 Erlang Distribution 64 7.5 Gamma Distribution 65 7.6 Weibull
Distribution 66 7.7 Chi-Square Distribution 67 7.8 Chi and Other Allied
Distributions 68 7.9 Student-t Density 71 7.10 Snedecor F Distribution 72
7.11 Lognormal Distribution 72 7.12 Beta Distribution 73 7.13 Cauchy
Distribution 74 7.14 Pareto Distribution 75 7.15 Gibbs Distribution 75 7.16
Mixed Distributions 75 7.17 Summary of Distributions of Continuous Random
Variables 76 8 Conditional Densities and Distributions 78 8.1 Conditional
Distribution and Density for P{A} 0 78 8.2 Conditional Distribution and
Density for P{A} = 0 80 8.3 Total Probability and Bayes' Theorem for
Densities 83 9 Joint Densities and Distributions 85 9.1 Joint Discrete
Distribution Functions 85 9.2 Joint Continuous Distribution Functions 86
9.3 Bivariate Gaussian Distributions 90 10 Moments and Conditional Moments
91 10.1 Expectations 91 10.2 Variance 92 10.3 Means and Variances of Some
Distributions 93 10.4 Higher-Order Moments 94 10.5 Correlation and Partial
Correlation Coefficients 95 10.5.1 Correlation Coefficients 95 10.5.2
Partial Correlation Coefficients 106 11 Characteristic Functions and
Generating Functions 108 11.1 Characteristic Functions 108 11.2 Examples of
Characteristic Functions 109 11.3 Generating Functions 111 11.4 Examples of
Generating Functions 112 11.5 Moment Generating Functions 113 11.6 Cumulant
Generating Functions 115 11.7 Table of Means and Variances 116 12 Functions
of a Single Random Variable 118 12.1 Random Variable g(X) 118 12.2
Distribution of Y = g(X) 119 12.3 Direct Determination of Density fY(y)
from fX(x) 129 12.4 Inverse Problem: Finding g(X) given fX(x) and fY(y) 132
12.5 Moments of a Function of a Random Variable 133 13 Functions of
Multiple Random Variables 135 13.1 Function of Two Random Variables, Z =
g(X,Y) 135 13.2 Two Functions of Two Random Variables, Z = g(X,Y), W=
h(X,Y) 143 13.3 Direct Determination of Joint Density fZW(z,w) from
fXY(x,y) 146 13.4 Solving Z = g(X,Y) Using an Auxiliary Random Variable 150
13.5 Multiple Functions of Random Variables 153 14 Inequalities,
Convergences, and Limit Theorems 155 14.1 Degenerate Random Variables 155
14.2 Chebyshev and Allied Inequalities 155 14.3 Markov Inequality 158 14.4
Chernoff Bound 159 14.5 Cauchy-Schwartz Inequality 160 14.6 Jensen's
Inequality 162 14.7 Convergence Concepts 163 14.8 Limit Theorems 165 15
Computer Methods for Generating Random Variates 169 15.1
Uniform-Distribution Random Variates 169 15.2 Histograms 170 15.3 Inverse
Transformation Techniques 172 15.4 Convolution Techniques 178 15.5
Acceptance-Rejection Techniques 178 16 Elements of Matrix Algebra 181 16.1
Basic Theory of Matrices 181 16.2 Eigenvalues and Eigenvectors of Matrices
186 16.3 Vector and Matrix Differentiation 190 16.4 Block Matrices 194 17
Random Vectors and Mean-Square Estimation 196 17.1 Distributions and
Densities 196 17.2 Moments of Random Vectors 200 17.3 Vector Gaussian
Random Variables 204 17.4 Diagonalization of Covariance Matrices 207 17.5
Simultaneous Diagonalization of Covariance Matrices 209 17.6 Linear
Estimation of Vector Variables 210 18 Estimation Theory 212 18.1 Criteria
of Estimators 212 18.2 Estimation of Random Variables 213 18.3 Estimation
of Parameters (Point Estimation) 218 18.4 Interval Estimation (Confidence
Intervals) 225 18.5 Hypothesis Testing (Binary) 231 18.6 Bayesian
Estimation 238 19 Random Processes 250 19.1 Basic Definitions 250 19.2
Stationary Random Processes 258 19.3 Ergodic Processes 269 19.4 Estimation
of Parameters of Random Processes 273 19.4.1 Continuous-Time Processes 273
19.4.2 Discrete-Time Processes 280 19.5 Power Spectral Density 287 19.5.1
Continuous Time 287 19.5.2 Discrete Time 294 19.6 Adaptive Estimation 298
20 Classification of Random Processes 320 20.1 Specifications of Random
Processes 320 20.1.1 Discrete-State Discrete-Time (DSDT) Process 320 20.1.2
Discrete-State Continuous-Time (DSCT) Process 320 20.1.3 Continuous-State
Discrete-Time (CSDT) Process 320 20.1.4 Continuous-State Continuous-Time
(CSCT) Process 320 20.2 Poisson Process 321 20.3 Binomial Process 329 20.4
Independent Increment Process 330 20.5 Random-Walk Process 333 20.6
Gaussian Process 338 20.7 Wiener Process (Brownian Motion) 340 20.8 Markov
Process 342 20.9 Markov Chains 347 20.10 Birth and Death Processes 357
20.11 Renewal Processes and Generalizations 366 20.12 Martingale Process
370 20.13 Periodic Random Process 374 20.14 Aperiodic Random Process
(Karhunen-Loeve Expansion) 377 21 Random Processes and Linear Systems 383
21.1 Review of Linear Systems 383 21.2 Random Processes through Linear
Systems 385 21.3 Linear Filters 393 21.4 Bandpass Stationary Random
Processes 401 22 Wiener and Kalman Filters 413 22.1 Review of Orthogonality
Principle 413 22.2 Wiener Filtering 414 22.3 Discrete Kalman Filter 425
22.4 Continuous Kalman Filter 433 23 Probability Modeling in Traffic
Engineering 437 23.1 Introduction 437 23.2 Teletraffic Models 437 23.3
Blocking Systems 438 23.4 State Probabilities for Systems with Delays 440
23.5 Waiting-Time Distribution for M/M/c/ infinity Systems 441 23.6 State
Probabilities for M/D/c Systems 443 23.7 Waiting-Time Distribution for
M/D/c/ infinity System 446 23.8 Comparison of M/M/c and M/D/c 448
References 451 24 Probabilistic Methods in Transmission Tomography 452 24.1
Introduction 452 24.2 Stochastic Model 453 24.3 Stochastic Estimation
Algorithm 455 24.4 Prior Distribution P{M} 457 24.5 Computer Simulation 458
24.6 Results and Conclusions 460 24.7 Discussion of Results 462 References
462 APPENDICES A A Fourier Transform Tables 463 B Cumulative Gaussian
Tables 467 C Inverse Cumulative Gaussian Tables 472 D Inverse Chi-Square
Tables 474 E Inverse Student-t Tables 481 F Cumulative Poisson Distribution
484 G Cumulative Binomial Distribution 488 H Computation of Roots of D(z) =
0 494 References 495 Index 498
Sets, Fields, and Events 1 1.1 Set Definitions 1 1.2 Set Operations 2 1.3
Set Algebras, Fields, and Events 5 2 Probability Space and Axioms 7 2.1
Probability Space 7 2.2 Conditional Probability 9 2.3 Independence 11 2.4
Total Probability and Bayes' Theorem 12 3 Basic Combinatorics 16 3.1 Basic
Counting Principles 16 3.2 Permutations 16 3.3 Combinations 18 4 Discrete
Distributions 23 4.1 Bernoulli Trials 23 4.2 Binomial Distribution 23 4.3
Multinomial Distribution 26 4.4 Geometric Distribution 26 4.5 Negative
Binomial Distribution 27 4.6 Hypergeometric Distribution 28 4.7 Poisson
Distribution 30 4.8 Newton-Pepys Problem and its Extensions 33 4.9
Logarithmic Distribution 40 4.9.1 Finite Law (Benford's Law) 40 4.9.2
Infinite Law 43 4.10 Summary of Discrete Distributions 44 5 Random
Variables 45 5.1 Definition of Random Variables 45 5.2 Determination of
Distribution and Density Functions 46 5.3 Properties of Distribution and
Density Functions 50 5.4 Distribution Functions from Density Functions 51 6
Continuous Random Variables and Basic Distributions 54 6.1 Introduction 54
6.2 Uniform Distribution 54 6.3 Exponential Distribution 55 6.4 Normal or
Gaussian Distribution 57 7 Other Continuous Distributions 63 7.1
Introduction 63 7.2 Triangular Distribution 63 7.3 Laplace Distribution 63
7.4 Erlang Distribution 64 7.5 Gamma Distribution 65 7.6 Weibull
Distribution 66 7.7 Chi-Square Distribution 67 7.8 Chi and Other Allied
Distributions 68 7.9 Student-t Density 71 7.10 Snedecor F Distribution 72
7.11 Lognormal Distribution 72 7.12 Beta Distribution 73 7.13 Cauchy
Distribution 74 7.14 Pareto Distribution 75 7.15 Gibbs Distribution 75 7.16
Mixed Distributions 75 7.17 Summary of Distributions of Continuous Random
Variables 76 8 Conditional Densities and Distributions 78 8.1 Conditional
Distribution and Density for P{A} 0 78 8.2 Conditional Distribution and
Density for P{A} = 0 80 8.3 Total Probability and Bayes' Theorem for
Densities 83 9 Joint Densities and Distributions 85 9.1 Joint Discrete
Distribution Functions 85 9.2 Joint Continuous Distribution Functions 86
9.3 Bivariate Gaussian Distributions 90 10 Moments and Conditional Moments
91 10.1 Expectations 91 10.2 Variance 92 10.3 Means and Variances of Some
Distributions 93 10.4 Higher-Order Moments 94 10.5 Correlation and Partial
Correlation Coefficients 95 10.5.1 Correlation Coefficients 95 10.5.2
Partial Correlation Coefficients 106 11 Characteristic Functions and
Generating Functions 108 11.1 Characteristic Functions 108 11.2 Examples of
Characteristic Functions 109 11.3 Generating Functions 111 11.4 Examples of
Generating Functions 112 11.5 Moment Generating Functions 113 11.6 Cumulant
Generating Functions 115 11.7 Table of Means and Variances 116 12 Functions
of a Single Random Variable 118 12.1 Random Variable g(X) 118 12.2
Distribution of Y = g(X) 119 12.3 Direct Determination of Density fY(y)
from fX(x) 129 12.4 Inverse Problem: Finding g(X) given fX(x) and fY(y) 132
12.5 Moments of a Function of a Random Variable 133 13 Functions of
Multiple Random Variables 135 13.1 Function of Two Random Variables, Z =
g(X,Y) 135 13.2 Two Functions of Two Random Variables, Z = g(X,Y), W=
h(X,Y) 143 13.3 Direct Determination of Joint Density fZW(z,w) from
fXY(x,y) 146 13.4 Solving Z = g(X,Y) Using an Auxiliary Random Variable 150
13.5 Multiple Functions of Random Variables 153 14 Inequalities,
Convergences, and Limit Theorems 155 14.1 Degenerate Random Variables 155
14.2 Chebyshev and Allied Inequalities 155 14.3 Markov Inequality 158 14.4
Chernoff Bound 159 14.5 Cauchy-Schwartz Inequality 160 14.6 Jensen's
Inequality 162 14.7 Convergence Concepts 163 14.8 Limit Theorems 165 15
Computer Methods for Generating Random Variates 169 15.1
Uniform-Distribution Random Variates 169 15.2 Histograms 170 15.3 Inverse
Transformation Techniques 172 15.4 Convolution Techniques 178 15.5
Acceptance-Rejection Techniques 178 16 Elements of Matrix Algebra 181 16.1
Basic Theory of Matrices 181 16.2 Eigenvalues and Eigenvectors of Matrices
186 16.3 Vector and Matrix Differentiation 190 16.4 Block Matrices 194 17
Random Vectors and Mean-Square Estimation 196 17.1 Distributions and
Densities 196 17.2 Moments of Random Vectors 200 17.3 Vector Gaussian
Random Variables 204 17.4 Diagonalization of Covariance Matrices 207 17.5
Simultaneous Diagonalization of Covariance Matrices 209 17.6 Linear
Estimation of Vector Variables 210 18 Estimation Theory 212 18.1 Criteria
of Estimators 212 18.2 Estimation of Random Variables 213 18.3 Estimation
of Parameters (Point Estimation) 218 18.4 Interval Estimation (Confidence
Intervals) 225 18.5 Hypothesis Testing (Binary) 231 18.6 Bayesian
Estimation 238 19 Random Processes 250 19.1 Basic Definitions 250 19.2
Stationary Random Processes 258 19.3 Ergodic Processes 269 19.4 Estimation
of Parameters of Random Processes 273 19.4.1 Continuous-Time Processes 273
19.4.2 Discrete-Time Processes 280 19.5 Power Spectral Density 287 19.5.1
Continuous Time 287 19.5.2 Discrete Time 294 19.6 Adaptive Estimation 298
20 Classification of Random Processes 320 20.1 Specifications of Random
Processes 320 20.1.1 Discrete-State Discrete-Time (DSDT) Process 320 20.1.2
Discrete-State Continuous-Time (DSCT) Process 320 20.1.3 Continuous-State
Discrete-Time (CSDT) Process 320 20.1.4 Continuous-State Continuous-Time
(CSCT) Process 320 20.2 Poisson Process 321 20.3 Binomial Process 329 20.4
Independent Increment Process 330 20.5 Random-Walk Process 333 20.6
Gaussian Process 338 20.7 Wiener Process (Brownian Motion) 340 20.8 Markov
Process 342 20.9 Markov Chains 347 20.10 Birth and Death Processes 357
20.11 Renewal Processes and Generalizations 366 20.12 Martingale Process
370 20.13 Periodic Random Process 374 20.14 Aperiodic Random Process
(Karhunen-Loeve Expansion) 377 21 Random Processes and Linear Systems 383
21.1 Review of Linear Systems 383 21.2 Random Processes through Linear
Systems 385 21.3 Linear Filters 393 21.4 Bandpass Stationary Random
Processes 401 22 Wiener and Kalman Filters 413 22.1 Review of Orthogonality
Principle 413 22.2 Wiener Filtering 414 22.3 Discrete Kalman Filter 425
22.4 Continuous Kalman Filter 433 23 Probability Modeling in Traffic
Engineering 437 23.1 Introduction 437 23.2 Teletraffic Models 437 23.3
Blocking Systems 438 23.4 State Probabilities for Systems with Delays 440
23.5 Waiting-Time Distribution for M/M/c/ infinity Systems 441 23.6 State
Probabilities for M/D/c Systems 443 23.7 Waiting-Time Distribution for
M/D/c/ infinity System 446 23.8 Comparison of M/M/c and M/D/c 448
References 451 24 Probabilistic Methods in Transmission Tomography 452 24.1
Introduction 452 24.2 Stochastic Model 453 24.3 Stochastic Estimation
Algorithm 455 24.4 Prior Distribution P{M} 457 24.5 Computer Simulation 458
24.6 Results and Conclusions 460 24.7 Discussion of Results 462 References
462 APPENDICES A A Fourier Transform Tables 463 B Cumulative Gaussian
Tables 467 C Inverse Cumulative Gaussian Tables 472 D Inverse Chi-Square
Tables 474 E Inverse Student-t Tables 481 F Cumulative Poisson Distribution
484 G Cumulative Binomial Distribution 488 H Computation of Roots of D(z) =
0 494 References 495 Index 498