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Stoyan V. Stoyanov, PhD, is the Chief Financial Researcher at FinAnalytica Inc.
Frank J. Fabozzi, PhD, CFA, is Professor in the Practice of Finance and Becton Fellow at Yale University's School of Management and the Editor of the Journal of Portfolio Management.
| Preface | |
| Acknowledgments About the Authors | |
| Concepts of Probability | |
| Introduction | |
| Basic Concepts | |
| Discrete Probability Distributions | |
| Bernoulli Distribution | |
| Binomial Distribution | |
| Poisson Distribution | |
| Continuous Probability Distributions | |
| Probability Distribution Function, Probability Density Function, and Cumulative Distribution Function | |
| The Normal Distribution | |
| Exponential Distribution | |
| Student's t-distribution | |
| Extreme Value Distribution | |
| Generalized Extreme Value Distribution | |
| Statistical Moments and Quantiles | |
| Location | |
| Dispersion | |
| Asymmetry | |
| Concentration in Tails | |
| Statistical Moments | |
| Quantiles | |
| Sample Moments | |
| Joint Probability Distributions | |
| Conditional Probability | |
| Definition of Joint Probability Distributions | |
| Marginal Distributions | |
| Dependence of Random Variables | |
| Covariance and Correlation | |
| Multivariate Normal Distribution | |
| Elliptical Distributions | |
| Copula Functions | |
| Probabilistic Inequalities | |
| Chebyshev's Inequality | |
| Fr'echet-Hoeffding Inequality | |
| Summary | |
| Optimization | |
| Introduction | |
| Unconstrained Optimization | |
| Minima and Maxima of a Differentiable Function | |
| Convex Functions | |
| Quasiconvex Functions | |
| Constrained Optimization | |
| Lagrange Multipliers | |
| Convex Programming | |
| Linear Programming | |
| Quadratic Programming | |
| Summary | |
| Probability Metrics | |
| Introduction | |
| Measuring Distances: The Discrete Case | |
| Sets of Characteristics | |
| Distribution Functions | |
| Joint Distribution | |
| Primary, Simple, and Compound Metrics | |
| Axiomatic Construction | |
| Primary Metrics | |
| Simple Metrics | |
| Compound Metrics | |
| Minimal and Maximal Metrics | |
| Summary | |
| Technical Appendix | |
| Remarks on the Axiomatic Construction of Probability Metrics | |
| Examples of Probability Distances | |
| Minimal and Maximal Distances | |
| Ideal Probability Metrics | |
| Introduction | |
| The Classical Central Limit Theorem | |
| The Binomial Approximation to the Normal Distribution | |
| The General Case | |
| Estimating the Distance from the Limit Distribution | |
| The Generalized Central Limit Theorem | |
| Stable Distributions | |
| Modeling Financial Assets with Stable Distributions | |
| Construction of Ideal Probability Metrics | |
| Definition | |
| Examples | |
| Summary | |
| Technical Appendix | |
| The CLT Conditions | |
| Remarks on Ideal Metrics | |
| Choice under Uncertainty | |
| Introduction | |
| Expected Utility Theory | |
| St. Petersburg Paradox | |
| The von Neumann-Morgenstern Expected Utility Theory | |
| Types of Utility Functions | |
| Stochastic Dominance | |
| First-Order Stochastic Dominance | |
| Second-Order Stochastic Dominance | |
| Rothschild-Stiglitz Stochastic Dominance | |
| Third-Order Stochastic Dominance | |
| Efficient Sets and the Portfolio Choice Problem | |
| Return versus Payoff | |
| Probability Metrics and Stochastic Dominance | |
| Summary | |
| Technical Appendix | |
| The Axioms of Choice | |
| Stochastic Dominance Relations of Order n | |
| Return versus Payoff and Stochastic | |
| Table of Contents provided by Publisher. All Rights Reserved. |
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