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Princeton Series in Finance Ser.: Dynamic Asset Pricing Theory : Third Edition by Darrell Duffie (2001, Hardcover)
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About this product
Product Identifiers
PublisherPrinceton University Press
ISBN-10069109022X
ISBN-139780691090221
eBay Product ID (ePID)25038413822
Product Key Features
Number of Pages488 Pages
Publication NameDynamic Asset Pricing Theory : Third Edition
LanguageEnglish
Publication Year2001
SubjectInvestments & Securities / Portfolio Management, General, Economics / General
FeaturesRevised
TypeTextbook
Subject AreaBusiness & Economics, Psychology
AuthorDarrell Duffie
SeriesPrinceton Series in Finance Ser.
FormatHardcover
Dimensions
Item Height1.5 in
Item Weight29 Oz
Item Length9.4 in
Item Width6.4 in
Additional Product Features
Edition Number3
Intended AudienceCollege Audience
LCCN2001-021235
Dewey Edition21
ReviewsThis is an important addition to the set of text/reference books on asset pricing theory. It will, if it has not already, become the standard text for the second Ph.D. course in security markets. Its treatment of contingent claim valuation, in particular, is unrivaled in its breadth and coherence. -- Journal of Economic Literature, "This is an important addition to the set of text/reference books on asset pricing theory. It will, if it has not already, become the standard text for the second Ph.D. course in security markets. Its treatment of contingent claim valuation, in particular, is unrivaled in its breadth and coherence." -- Journal of Economic Literature, "This is an important addition to the set of text/reference books on asset pricing theory. It will, if it has not already, become the standard text for the second Ph.D. course in security markets. Its treatment of contingent claim valuation, in particular, is unrivaled in its breadth and coherence."-- Journal of Economic Literature, This is an important addition to the set of text/reference books on asset pricing theory. It will, if it has not already, become the standard text for the second Ph.D. course in security markets. Its treatment of contingent claim valuation, in particular, is unrivaled in its breadth and coherence.
IllustratedYes
Dewey Decimal332.6
Edition DescriptionRevised edition
Table Of ContentPreface xiii PART I DISCRETE-TIME MODELS 1 1. Introduction to State Pricing 3 A. Arbitrage and State Prices 3 B. Risk-Neutral Probabilities 4 C. Optimality and Asset Pricing 5 D. Efficiency and Complete Markets 8 E. Optimality and Representative Agents 8 F. State-Price Beta Models 11 Exercises 12 Notes 17 2. The Basic Multiperiod Model 21 A. Uncertainty 21 B Security Markets 22 C. Arbitrage, State Prices, and Martingales 22 D. Individual Agent Optimality 24 E. Equilibrium and Pareto Optimality 26 F. Equilibrium Asset Pricing 27 G. Arbitrage and Martingale Measures 28 H. Valuation of Redundant Securities 30 I. American Exercise Policies and Valuation 31 J. Is Early Exercise Optimal? 35 Exercises 37 Notes 45 3 The Dynamic Programming Approach 49 A. The Bellman Approach 49 B. First-Order Bellman Conditions 50 C. Markov Uncertainty .51 D. Markov Asset Pricing 52 E. Security Pricing by Markov Control 52 F. Markov Arbitrage-Free Valuation 55 G Early Exercise and Optimal Stopping 56 Exercises 58 Notes 63 4. The Infinite-Horizon Setting 65 A. Markov Dynamic Programming .65 B. Dynamic Programming and Equilibrium.69 C. Arbitrage and State Prices 70 D. Optimality and State Prices.71 E. Method-of-Moments Estimation .73 Exercises 76 Notes 78 PART 11 CONTINUOUS-TIME MODELS 81 5. The Black-Scholes Model 83 A. Trading Gains for Brownian Prices 83 B. Martingale Trading Gains 85 C. Ito Prices and Gains 86 D. Ito's Formula 87 E. The Black-Scholes Option-Pricing Formula 88 F. Black-Scholes Formula: First Try 90 G. The PDE for Arbitrage-Free Prices 92 H. The Feynman-Kac Solution 93 I. The Multidimensional Case 94 Exercises 97 Notes 100 6. State Prices and Equivalent Martingale Measures 101 A. Arbitrage 101 B. Numeraire Invariance 102 C. State Prices and Doubling Strategies 103 D. Expected Rates of Return 106 E. Equivalent Martingale Measures 108 F. State Prices and Martingale Measures 110 G. Girsanov and Market Prices of Risk 111 H. Black-Scholes Again 115 I. Complete Markets 116 J. Redundant Security Pricing 119 K. Martingale Measures from No Arbitrage 120 L. Arbitrage Pricing with Dividends 123 M. Lumpy Dividends and Term Structures 125 N. Martingale Measures, Infinite Horizon 127 Exercises 128 Notes 131 7. Term-Structure Models 135 A. The Term Structure 136 B. One-Factor Term-Structure Models 137 C. The Gaussian Single-Factor Models 139 D. The Cox-Ingersoll-Ross Model 141 E. The Affine Single-Factor Models 142 F. Term-Structure Derivatives 144 G. The Fundamental Solution 146 H. Multifactor Models 148 1. Affine Term-Structure Models 149 J. The HJM Model of Forward Rates 151 K. Markovian Yield Curves and SPDEs 154 Exercises 155 Notes 161 8. Derivative Pricing 167 A. Martingale Measures in a Black Box 167 B. Forward Prices 169 C. Futures and Continuous Resettlement 171 D. Arbitrage-Free Futures Prices 172 E. Stochastic Volatility 174 F. Option Valuation by Transform Analysis 178 G. American Security Valuation 182 H. American Exercise Boundaries 186 1. Lookback Options 189 Exercises 191 Notes 196 9. Portfolio and Consumption Choice 203 A. Stochastic Control 203 B. Merton's Problem 206 C. Solution to Merton's Problem 209 D. The Infinite-Horizon Case 213 E. The Martingale Formulation 214 F. Martingale Solution 217 G. A Generalization 220 H. The Utility-Gradient Approach 221 Exercises 224 Notes 232 10. Equilibrium 235 A. The Primitives 235 B. Security-Spot Market Equilibrium 236 C. Arrow-Debreu Equilibrium 237 D. Implementing Arrow-Debreu Equilibrium 238 E. Real Security Prices 240 F. Optimality with Additive Utility 241 G. Equilibrium with Additive Utility 243 H. The Consumption-Based CAPM 245 I. The CIR T
SynopsisThis is a thoroughly updated edition of "Dynamic Asset Pricing Theory", the standard text for doctoral students and researchers on the theory of asset pricing and portfolio selection in multiperiod settings under uncertainty. The asset pricing results are based on the three increasingly restrictive assumptions: absence of arbitrage, single-agent optimality, and equilibrium. These results are unified with two key concepts, state prices and martingales. Technicalities are given relatively little emphasis, so as to draw connections between these concepts and to make plain the similarities between discrete and continuous-time models. Readers should be particularly intrigued by this latest edition's most significant new feature: a chapter on corporate securities that offers alternative approaches to the valuation of corporate debt. Also, while much of the coninuous-time portion of the theory is based on Brownian motion, this third edition introduces jumps - for example, those associated with Poisson arrivals - in order to accommodate surprise events such as bond defaults. Applications include term-structure models, derivative valuation, and hedging methods.Numerical methods covered inc, Suitable for doctoral students and researchers, this book talks about the theory of asset pricing and portfolio selection in multiperiod settings under uncertainty. The asset pricing results are based on the three restrictive assumptions: absence of arbitrage, single-agent optimality, and equilibrium., This is a thoroughly updated edition of Dynamic Asset Pricing Theory , the standard text for doctoral students and researchers on the theory of asset pricing and portfolio selection in multiperiod settings under uncertainty. The asset pricing results are based on the three increasingly restrictive assumptions: absence of arbitrage, single-agent optimality, and equilibrium. These results are unified with two key concepts, state prices and martingales. Technicalities are given relatively little emphasis, so as to draw connections between these concepts and to make plain the similarities between discrete and continuous-time models. Readers will be particularly intrigued by this latest edition's most significant new feature: a chapter on corporate securities that offers alternative approaches to the valuation of corporate debt. Also, while much of the continuous-time portion of the theory is based on Brownian motion, this third edition introduces jumps--for example, those associated with Poisson arrivals--in order to accommodate surprise events such as bond defaults. Applications include term-structure models, derivative valuation, and hedging methods. Numerical methods covered include Monte Carlo simulation and finite-difference solutions for partial differential equations. Each chapter provides extensive problem exercises and notes to the literature. A system of appendixes reviews the necessary mathematical concepts. And references have been updated throughout. With this new edition, Dynamic Asset Pricing Theory remains at the head of the field.
LC Classification NumberHG4637.D84 2001
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