Produktbild: Handbook of Monte Carlo Methods

Handbook of Monte Carlo Methods

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Beschreibung

Produktdetails

Einband

Gebundene Ausgabe

Erscheinungsdatum

15.03.2011

Verlag

John Wiley & Sons Inc

Seitenzahl

772

Maße (L/B/H)

26/18,3/4,6 cm

Gewicht

1626 g

Auflage

1. Auflage

Sprache

Englisch

ISBN

978-0-470-17793-8

Beschreibung

Rezension

"Statisticians Kroese, Thomas Taimre (both U. of Queensland), and Zdravko I. Botev (U. of Montreal) offer researchers and graduate and advanced graduate students a compendium of Monte Carlo methods, which are statistical methods that involve random experiments on a computer. There are a great many such methods being used for so many kinds of problems in so many fields that such an overall view is hard to find. Combining theory, algorithms, and applications, they consider such topics as uniform random number generation, probability distributions, discrete event simulation, variance reduction, estimating derivatives, and applications to network reliability." (Annotation ©2011 Book News Inc. Portland, OR)

Produktdetails

Einband

Gebundene Ausgabe

Erscheinungsdatum

15.03.2011

Verlag

John Wiley & Sons Inc

Seitenzahl

772

Maße (L/B/H)

26/18,3/4,6 cm

Gewicht

1626 g

Auflage

1. Auflage

Sprache

Englisch

ISBN

978-0-470-17793-8

Herstelleradresse

Libri GmbH
Europaallee 1
36244 Bad Hersfeld
DE

Email: GPSR Kontakt

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  • Produktbild: Handbook of Monte Carlo Methods
  • Preface.

    Acknowledgments.

    1 Uniform Random Number Generation.

    1.1 Random Numbers.

    1.2 Generators Based on Linear Recurrences.

    1.3 Combined Generators.

    1.4 Other Gnerators.

    1.5 Tests for Random Number Generators.

    References.

    2 Quasirandom Number Generation.

    2.1 Multidimensional Integration.

    2.2 Van der Corput and Digital Sequences.

    2.3 Halton Sequences.

    2.4 Faure Sequences.

    2.5 Sobol' Sequences.

    2.6 Lattice Methods.

    2.7 Randomization and Scrambling.

    References.

    3 Random Variable Generation.

    3.1 Generic Algorithms Based on Common Transformations.

    3.2 Copulas.

    3.3 Generation Methods for Various Random Objects.

    References.

    4 Probability Distributions.

    4.1 Discrete Distributions.

    4.2 Continuous Distributions.

    4.3 Multivariate Distributions.

    References.

    5 Random Process Generation.

    5.1 Gaussian Processes.

    5.2 Markov Chains.

    5.3 Markov Jump Processes.

    5.4 Poisson Processes.

    5.5 Wiener Process and Brownian Motion.

    5.6 Stochastic Differential Equations and Diffusion Processes.

    5.7 Brownian Bridge.

    5.8 Geometric Brownian Motion.

    5.9 Ornstein-Uhlenbeck Process.

    5.10 Reflected Brownian Motion.

    5.11 Fractional Brownian Motion.

    5.12 Random Fields.

    5.13 Lévy Processes.

    5.14 Time Series.

    References.

    6 Markov Chain Monte Carlo.

    6.1 Metropolis-Hastings Algorithm.

    6.2 Gibbs Sampler.

    6.3 Specialized Samplers.

    6.4 Implementation Issues.

    6.5 Perfect Sampling.

    References.

    7 Discrete Event Simulation.

    7.1 Simulation Models.

    7.2 Discrete Event Systems.

    7.3 Event-Oriented Approach.

    7.4 More Examples of Discrete Event Simulation.

    References.

    8 Statistical Analysis of Simulation Data.

    8.1 Simulation Data.

    8.2 Estimation of Performance Measures for Independent Data.

    8.3 Estimation of Steady-State Performance Measures.

    8.4 Emprical Cdf.

    8.5 Kernal Density Estimation.

    8.6 Resampling and the Bootstrap Method.

    8.7 Goodness of Fit.

    References.

    9 Variance Reduction.

    9.1 Variance Reduction Example.

    9.2 Antithetic Random Variables.

    9.3 Control Variables.

    9.4 Conditional Monte Carlo.

    9.5 Stratified Sampling.

    9.6 Latin Hypercube Sampling.

    9.7 Importance Scaling.

    9.8 Quasi Monte Carlo

    References.

    10 Rare-Event Simulation.

    10.1 Efficiency of Estimators.

    10.2 Importance Sampling Methods for Light Tails.

    10.3 Conditioning Methods for Heavy Tails.

    10.4 State-Dependent Importance Sampling.

    10.5 Cross-Entropy Method for Rare-Event Simulation.

    10.6 Splitting Method.

    References.

    11 Estimation of Derivatives.

    11.1 Gradient Estimation.

    11.2 Finite Difference Method.

    11.3 Infinitesimal Perturbation Analysis.

    11.4 Score Function Method.

    11.5 Weak Deriatives.

    11.6 Sensitivity Analysis for Regenerative Processes.

    References.

    12 Randomized Optimization.

    12.1 Stochastic Approximation.

    12.2 Stochastic Counterpart Method.

    12.3 Simulated Annealing.

    12.4 Evolutionary Algorithms.

    12.5 Cross-Entropy Method for Optimization.

    12. 6 Other Randomized Optimization Techniques.

    References.

    13 Cross-Entropy Method.

    13.1 Cross-Entropy Method.

    13.2 Cross-Entropy Method for Estimation.

    13.3 Cross-Entropy Method for Optimization.

    References.

    14 Particle Methods.

    14.1 Sequential Monte Carlo.

    14.2 Particle Splitting.

    14.3 Splitting for Static Rare-Event Probability Estimaton.

    14.4 Adaptive Splitting Algorithm.

    14.5 Estimation of Multidimensional Integrals.

    14.6 Combinatorial Optimization via Splitting.

    14.7 Markov Chain Monte Carlo With Splitting.

    References.

    15 Applications to Finance.

    15.1 Standard Model.

    15.2 Pricing via Monte Carlo Simulation.

    15.3 Sensitivities.

    References.

    16 Applications to Network  Reliability.

    16.1 Network Reliability.

    16.2 Evolution Model for a Static Network.

    16.3 Conditional Monte Carlo.

    16.4 Importance Sampling for Network Reliability.

    16.5 Splitting Method.

    References.

    17 Applications to Differential Equations.

    17. 1 Connections Between Stochastic and Partial Di_erential Equations.

    17.2 Transport Processes and Equations.

    17.3 Connections to ODEs Through Scaling.

    References.

    Appendix A: Probability and Stochastic Processes.

    Appendix B: Elements of Mathematical Statistics.

    Appendix C: Optimization.

    Appendix D: Miscellany.

    References.

    Acronyms and Abbreviations.

    List of Symbols.

    List of Distributions.

    Index.