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金融衍生品数学模型(第2版) [Mathematical Models of Financial Derivatives Second Edition] pdf epub mobi txt 电子书 下载 2022

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金融衍生品数学模型(第2版) [Mathematical Models of Financial Derivatives Second Edition]

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郭宇权 著



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发表于2022-01-19

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出版社: 世界图书出版公司
ISBN:9787510005503
版次:1
商品编码:10104519
包装:平装
外文名称:Mathematical Models of Financial Derivatives Second Edition
开本:24开
出版时间:2010-04-01
用纸:胶版纸
页数:530
正文语种:英语

金融衍生品数学模型(第2版) [Mathematical Models of Financial Derivatives Second Edition] epub 下载 mobi 下载 pdf 下载 txt 电子书 下载 2022

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金融衍生品数学模型(第2版) [Mathematical Models of Financial Derivatives Second Edition] epub 下载 mobi 下载 pdf 下载 txt 电子书 下载 2022

金融衍生品数学模型(第2版) [Mathematical Models of Financial Derivatives Second Edition] pdf epub mobi txt 电子书 下载



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内容简介

《金融衍生品数学模型(第2版)》旨在运用金融工程方法讲述模型衍生品背后的理论,作为重点介绍了对大多数衍生证券很常用的鞅定价原理。书中还分析了固定收入市场中的大量金融衍生品,强调了定价、对冲及其风险策略。《金融衍生品数学模型(第2版)》从著名的期权定价模型的Black-Scholes-Merton公式开始,讲述衍生品定价模型和利率模型中的最新进展,解决各种形式衍生品定价问题的解析技巧和数值方法。目次:衍生品工具介绍;金融经济和随机计算;期权定价模型;路径依赖期权;美国期权;定价期权的数值方案;利率模型和债券计价;利率衍生品:债券期权、LIBOR和交换产品。

内页插图

目录

Preface
1 Introduction to Derivative Instruments
1.1 Financial Options and Their Trading Strategies
1.1.1 Trading Strategies Involving Options
1.2 Rational Boundaries for Option Values
1.2.1 Effects of Dividend Payments
1.2.2 Put-Call Parity Relations
1.2.3 Foreign Currency Options
1.3 Forward and Futures Contracts
1.3.1 Values and Prices of Forward Contracts
1.3.2 Relation between Forward and Futures Prices
1.4 Swap Contracts
1.4.1 Interest Rate Swaps
1.4.2 Currency Swaps
1.5 Problems

2 Financial Economics and Stochastic Calculus
2.1 Single Period Securities Models
2.1.1 Dominant Trading Strategies and Linear Pricing Measures
2.1.2 Arbitrage Opportunities and Risk Neutral Probability Measures
2.1.3 Valuation of Contingent Claims
2.1.4 Principles of Binomial Option Pricing Model
2.2 Filtrations, Martingales and Multiperiod Models
2.2.1 Information Structures and Filtrations
2.2.2 Conditional Expectations and Martingales
2.2.3 Stopping Times and Stopped Processes
2.2.4 Multiperiod Securities Models
2.2.5 Multiperiod Binomial Models
2.3 Asset Price Dynamics and Stochastic Processes
2.3.1 Random Walk Models
2.3.2 Brownian Processes
2.4 Stochastic Calculus: Itos Lemma and Girsanovs Theorem
2.4.1 Stochastic Integrals
2.4.2 Itos Lemma and Stochastic Differentials
2.4.3 Itos Processes and Feynman-Kac Representation Formula
2.4.4 Change of Measure: Radon-Nikodym Derivative and Girsanovs Theorem.
2.5 Problems

3 Option Pricing Models: Blaek-Scholes-Merton Formulation
3.1 Black-Scholes-Merton Formulation
3.1.1 Riskless Hedging Principle
3.1.2 Dynamic Replication Strategy
3.1.3 Risk Neutrality Argument
3.2 Martingale Pricing Theory
3.2.1 Equivalent Martingale Measure and Risk Neutral Valuation
3.2.2 Black-Scholes Model Revisited
3.3 Black-Scholes Pricing Formulas and Their Properties
3.3.1 Pricing Formulas for European Options
3.3.2 Comparative Statics
3.4 Extended Option Pricing Models
3.4.1 Options on a Dividend-Paying Asset
3.4.2 Futures Options
3.4.3 Chooser Options
3.4.4 Compound Options
3.4.5 Mertons Model of Risky Debts
3.4.6 Exchange Options
3.4.7 Equity Options with Exchange Rate Risk Exposure
3.5 Beyond the Black-Scholes Pricing Framework
3.5.1 Transaction Costs Models
3.5.2 Jump-Diffusion Models
3.5.3 Implied and Local Volatilities
3.5.4 Stochastic Volatility Models
3.6 Problems

4 Path Dependent Options
4.1 Barrier Options
4.1.1 European Down-and-Out Call Options
4.1.2 Transition Density Function and First Passage Time Density
4.1.3 Options with Double Barriers
4.1.4 Discretely Monitored Barrier Options
4.2 Lookback Options
4.2.1 European Fixed Strike Lookback Options
4.2.2 European Floating Strike Lookback Options
4.2.3 More Exotic Forms of European Lookback Options
4.2.4 Differential Equation Formulation
4.2.5 Discretely Monitored Lookback Options
4.3 Asian Options.
4.3.1 Partial Differential Equation Formulation
4.3.2 Continuously Monitored Geometric Averaging Options
4.3.3 Continuously Monitored Arithmetic Averaging Options
4.3.4 Put-Call Parity and Fixed-Floating Symmetry Relations
4.3.5 Fixed Strike Options with Discrete Geometric Averaging
4.3.6 Fixed Strike Options with Discrete Arithmetic Averaging
4.4 Problems

5 American Options
5.1 Characterization of the Optimal Exercise Boundaries
5.1.1 American Options on an Asset Paying Dividend Yield
5.1.2 Smooth Pasting Condition.
5.1.3 Optimal Exercise Boundary for an American Call
5.1.4 Put-Call Symmetry Relations.
5.1.5 American Call Options on an Asset Paying Single Dividend
5.1.6 One-Dividend and Multidividend American Put Options
5.2 Pricing Formulations of American Option Pricing Models
5.2.1 Linear Complementarity Formulation
5.2.2 Optimal Stopping Problem
5.2.3 Integral Representation of the Early Exercise Premium
5.2.4 American Barrier Options
5.2.5 American Lookback Options
5.3 Analytic Approximation Methods
5.3.1 Compound Option Approximation Method
5.3.2 Numerical Solution of the Integral Equation
5.3.3 Quadratic Approximation Method
5.4 Options with Voluntary Reset Rights
5.4.1 Valuation of the Shout Floor
5.4.2 Reset-Strike Put Options
5.5 Problems

6 Numerical Schemes for Pricing Options
6.1 Lattice Tree Methods
6.1.1 Binomial Model Revisited
6.1.2 Continuous Limits of the Binomial Model
6.1.3 Discrete Dividend Models
6.1.4 Early Exercise Feature and Callable Feature
6.1.5 Trinomial Schemes
6.1.6 Forward Shooting Grid Methods
6.2 Finite Difference Algorithms
6.2.1 Construction of Explicit Schemes
6.2.2 Implicit Schemes and Their Implementation Issues
6.2.3 Front Fixing Method and Point Relaxation Technique
6.2.4 Truncation Errors and Order of Convergence
6.2.5 Numerical Stability and Oscillation Phenomena
6.2.6 Numerical Approximation of Auxiliary Conditions
6.3 Monte Carlo Simulation
6.3.1 Variance Reduction Techniques
6.3.2 Low Discrepancy Sequences
6.3.3 Valuation of American Options
6.4 Problems

7 Interest Rate Models and Bond Pricing
7.1 Bond Prices and Interest Rates
7.1.1 Bond Prices and Yield Curves
7.1.2 Forward Rate Agreement, Bond Forward and Vanilla Swap
7.1.3 Forward Rates and Short Rates
7.1.4 Bond Prices under Deterministic Interest Rates
7.2 One-Factor Short Rate Models
7.2.1 Short Rate Models and Bond Prices
7.2.2 Vasicek Mean Reversion Model
7.2.3 Cox-Ingersoll-Ross Square Root Diffusion Model
7.2.4 Generalized One-Factor Short Rate Models
7.2.5 Calibration to Current Term Structures of Bond Prices
7.3 Multifactor Interest Rate Models
7.3.1 Short Rate/Long Rate Models
7.3.2 Stochastic Volatility Models
7.3.3 Affine Term Structure Models
7.4 Heath-Jarrow-Morton Framework
7.4.1 Forward Rate Drift Condition
7.4.2 Short Rate Processes and Theft Markovian Characterization
7.4.3 Forward LIBOR Processes under Ganssian HIM Framework
7.5 Problems

8 Interest Rate Derivatives: Bond Options, LIBOR and Swap Products
8.1 Forward Measure and Dynamics of Forward Prices
8.1.1 Forward Measure
8.1.2 Pricing of Equity Options under Stochastic Interest Rates
8.1.3 Futures Process and Futures-Forward Price Spreadi
8.2 Bond Options and Range Notes
8.2.1 Options on Discount Bonds and Coupon-Bearing Bonds
8.2.2 Range Notes
8.3 Caps and LIBOR Market Models
8.3.1 Pricing of Caps under Gaussian HJM Framework
8.3.2 Black Formulas and LIBOR Market Models
8.4 Swap Products and Swaptions
8.4.1Forward Swap Rates and Swap Measure
8.4.2 Approximate Pricing of Swaption under Lognormal LIBOR Market Model
8.4.3 Cross-Currency Swaps
8.5 Problems
References
Author Index
Subject Index

前言/序言

  In the past three decades, we have witnessed the phenomenal growth in the trading of financial derivatives and structured products in the financial markets around the globe and the surge in research on derivative pricing theory,cading financial institutions are hiring graduates with a science background who can use advanced analyrical and numerical techniques to price financial derivatives and manage portfolio risks, a phenomenon coined as Rocket Science on Wall Street. There are now more than a hundred Master level degreed programs in Financial Engineering/Quantitative Finance/Computational Finance in different continents. This book is written as an introductory textbook on derivative pricing theory for students enrolled in these degree programs. Another audience of the book may include practitioners in quantitative teams in financial institutions who would like to acquire the knowledge of option pricing techniques and explore the new development in pricing models of exotic structured derivatives. The level of mathematics in this book is tailored to readers with preparation at the advanced undergraduate level of science and engineering majors, in particular, basic proficiencies in probability and statistics, differential equations, numerical methods, and mathematical analysis. Advance knowledge in stochastic processes that are relevant to the martingale pricing theory, like stochastic differential calculus and theory of martingale, are 金融衍生品数学模型(第2版) [Mathematical Models of Financial Derivatives Second Edition] 电子书 下载 mobi epub pdf txt

金融衍生品数学模型(第2版) [Mathematical Models of Financial Derivatives Second Edition] pdf epub mobi txt 电子书 下载

用户评价

评分

当大家看到我的这一篇评价时,表示我对产品是认可的,尽管我此刻的评论是复制黏贴的。这一方面是为了肯定商家的服务,另一方面是为了节省自己的时间,因为差评我会直接说为什么的。所以大家就当作是产品质量合格的意思来看就行了。最后祝京东越做越好,大家幸福平安,中华民族繁荣昌盛。

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好。。。。。。。。

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好评…………

评分

金融衍生产品(derivatives)是指其价值依赖于基础资产(underlyings)价值变动的合约(contracts)。这种合约可以是标准化的,也可以是非标准化的。标准化合约是指其标的物(基础资产)的交易价格、交易时间、资产特征、交易方式等都是事先标准化的,因此此类合约大多在交易所上市交易,如期货。非标准化合约是指以上各项由交易的双方自行约定,因此具[1]有很强的灵活性,比如远期协议。

评分

(2)根据原生资产分类,即股票、利率、汇率和商品。如果再加以细分,股票类中又包括具体的股票(股票期货、股票期权合约)和由股票组合形成的股票指数期货和期权合约等;利率类中又可分为以短期存款利率为代表的短期利率(如利率期货、利率远期、利率期权、利率互换合约)和以长期债券利率为代表的长期利率(如债券期货、债券期权合约);货币类中包括各种不同币种之间的比值;商品类中包括各类大宗实物商品。

评分

(2)根据原生资产分类,即股票、利率、汇率和商品。如果再加以细分,股票类中又包括具体的股票(股票期货、股票期权合约)和由股票组合形成的股票指数期货和期权合约等;利率类中又可分为以短期存款利率为代表的短期利率(如利率期货、利率远期、利率期权、利率互换合约)和以长期债券利率为代表的长期利率(如债券期货、债券期权合约);货币类中包括各种不同币种之间的比值;商品类中包括各类大宗实物商品。

评分

金融衍生工具是交易双方通过对利率、汇率、股价等因素变动的趋势的预测,约定在未来某一时间按一定的条件进行交易或选择是否交易的合约。无论是哪一种金融衍生工具,都会影响交易者在未来一段时间内或未来某时间上的现金流,跨期交易的特点十分突出。这就要求交易的双方对利率、汇率、股价等价格因素的未来变动趋势作出判断,而判断的准确与否直接决定了交易者的交易盈亏。

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好评…………

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很好的一本书

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