点击选择搜索分类
首页 - 工业技术- 正文
☆☆☆☆☆
||
[美] 贝克 著
出版社: 世界图书出版公司 ISBN:9787510027260 版次:1 商品编码:10762446 包装:平装 开本:24开 出版时间:2010-09-01 用纸:胶版纸 页数:355
1 asset pricing basics
1.1 fundamental concepts
1.2 state prices in a one-period binomial model
1.3 probabilities and numeraires
1.4 asset pricing with a continuum of states
1.5 introduction to option pricing
1.6 an incomplete markets example
problems
2 continuous-time models
2.1 simulating a brownian motion
2.2 quadratic variation
2.3 it6 processes
2.4 it6's formula
2.5 multiple it5 processes
2.6 examples of it6's formula
2.7 reinvesting dividends
2.8 geometric brownian motion
2.9 numeraires and probabilities
2.10 tail probabilities of geometric brownian motions
2.11 volatilities
problems
3 black-scholes
3.1 digital options
3.2 share digitals
3.3 puts and calls
3.4 greeks
3.5 delta hedging
3.6 gamma hedging
3.7 implied volatilities
3.8 term structure of volatility
3.9 smiles and smirks
3.10 calculations in vba
problems
4 estimating and modelling volatility
4.1 statistics review
4.2 estimating a constant volatility and mean
4.3 estimating a changing volatility
4.4 garch models
4.5 stochastic volatility models
4.6 smiles and smirks again
4.7 hedging and market completeness
problems
5 introduction to monte carlo and binomial models
5.1 introduction to monte carlo
5.2 introduction to binomial models
5.3 binomial models for american options
5.4 binomial parameters
5.5 binomial greeks
5.6 monte carlo greeks i: difference ratios
5.7 monte carlo greeks ii: pathwise estimates
5.8 calculations in vba
problems
part ii advanced option pricing
6 foreign exchange
6.1 currency options
6.2 options on foreign assets struck in foreign currency
6.3 options on foreign assets struck in domestic currency
6.4 currency forwards and futures
6.5 quantos
6.6 replicating quantos
6.7 quanto forwards
6.8 quanto options
6.9 return swaps
6.10 uncovered interest parity
problems
7 forward, futures, and exchange options
7.1 margrabe's formula
7.2 black's formula
7.3 merton's formula
7.4 deferred exchange options
7.5 calculations in vba
7.6 greeks and hedging
7.7 the relation of futures prices to forward prices
7.8 futures options
7.9 time-varying volatility
7.10 hedging with forwards and futures
7.11 market completeness
problems
8 exotic options
8.1 forward-start options
8.2 compound options
8.3 american calls with discrete dividends
8.4 choosers
8.5 options on the max or min
8.6 barrier options
8.7 lookbacks
8.8 basket and spread options
8.9 asian options
8.10 calculations in vba
problems
9 more on monte carlo and binomial valuation
9.1 monte carlo models for path-dependent options
9.2 binomial valuation of basket and spread options
9.3 monte carlo valuation of basket and spread options
9.4 antithetic variates in monte carlo
9.5 control variates in monte carlo
9.6 accelerating binomial convergence
9.7 calculations in vba
problems
10 finite difference methods
10.1 fundamental pde
10.2 discretizing the pde
10.3 explicit and implicit methods
10.4 crank-nicolson
10.5 european options
10.6 american options
10.7 barrier options
10.8 calculations in vba
problems
part iii fixed income
11 fixed income concepts
11.1 the yield curve
11.2 libor
11.3 swaps
11.4 yield to maturity, duration, and convexity
11.5 principal components
11.6 hedging principal components
problems
12 introduction to fixed income derivatives
12.1 caps and floors
12.2 forward rates
12.3 portfolios that pay spot rates
12.4 the market model for caps and floors
12.5 the market model for european swaptions
12.6 a comment on consistency
12.7 caplets as puts on discount bonds
12.8 swaptions as options on coupon bonds
12.9 calculations in vba
problems
13 valuing derivatives in the extended vasicek model
13.1 the short rate and discount bond prices
13.2 the vasicek mode]
13.3 estimating the vasicek model
13.4 hedging in the vasicek model
13.5 extensions of the vasicek model
13.6 fitting discount bond prices and forward rates
13.7 discount bond options, caps and floors
13.8 coupon bond options and swaptions
13.9 captions and floortions
13.10 yields and yield volatilities
13.11 the general hull-white model
13.12 calculations in vba
problems
14 a brief survey of term structure models
14.1 ho-lee
14.2 black-derman-toy
14.3 black-karasinski
14.4 cox-ingersoll-ross
14.5 longstaff-schwartz
14.6 heath-jarrow-morton
14.7 market models again
problems
ppendices
a programming in vba
a.1 vba editor and modules
a.2 subroutines and functions
a.a message box and input box
a.4 writing to and reading from ceils
a.5 variables and assignments
a.6 mathematical operations
a.7 random numbers
a.8 for loops
a.9 while loops and logical expressions
a.10 if, else, and elseif statements
a.11 variable declarations
a.12 variable passing
a.13 arrays
a.14 debugging
b miscellaneous facts about continuous-time models
b.1 girsanov's theorem
b.2 the minimum of a geometric brownian motion
b.3 bessel squared processes and the cir model
list of programs
list of symbols
references
index
衍生证券教程:理论和计算 电子书 下载 mobi epub pdf txt
衍生证券教程:理论和计算-so88
衍生证券教程:理论和计算 pdf epub mobi txt 电子书 下载 2022
图书介绍
☆☆☆☆☆
||
[美] 贝克 著
出版社: 世界图书出版公司 ISBN:9787510027260 版次:1 商品编码:10762446 包装:平装 开本:24开 出版时间:2010-09-01 用纸:胶版纸 页数:355
内容简介
This book is an outgrowth of notes compiled by the author while teaching courses for undergraduate and masters/MBA finance students at Washing-ton University in St. Louis and the Institut ffir HShere Studien in Vienna. At one time, a course in Options and Futures was considered an advanced finance elective, but now such a course is nearly mandatory for any finance major and is an elective chosen by many non-finance majors as well. Moreover, students are exposed to derivative securities in courses on Investments, International Finance, Risk Management, Investment Banking, Fixed Income, etc. This ex-pansion of education in derivative securities mirrors the increased importance of derivative securities in corporate finance and investment management.目录
part i introduction to option pricing1 asset pricing basics
1.1 fundamental concepts
1.2 state prices in a one-period binomial model
1.3 probabilities and numeraires
1.4 asset pricing with a continuum of states
1.5 introduction to option pricing
1.6 an incomplete markets example
problems
2 continuous-time models
2.1 simulating a brownian motion
2.2 quadratic variation
2.3 it6 processes
2.4 it6's formula
2.5 multiple it5 processes
2.6 examples of it6's formula
2.7 reinvesting dividends
2.8 geometric brownian motion
2.9 numeraires and probabilities
2.10 tail probabilities of geometric brownian motions
2.11 volatilities
problems
3 black-scholes
3.1 digital options
3.2 share digitals
3.3 puts and calls
3.4 greeks
3.5 delta hedging
3.6 gamma hedging
3.7 implied volatilities
3.8 term structure of volatility
3.9 smiles and smirks
3.10 calculations in vba
problems
4 estimating and modelling volatility
4.1 statistics review
4.2 estimating a constant volatility and mean
4.3 estimating a changing volatility
4.4 garch models
4.5 stochastic volatility models
4.6 smiles and smirks again
4.7 hedging and market completeness
problems
5 introduction to monte carlo and binomial models
5.1 introduction to monte carlo
5.2 introduction to binomial models
5.3 binomial models for american options
5.4 binomial parameters
5.5 binomial greeks
5.6 monte carlo greeks i: difference ratios
5.7 monte carlo greeks ii: pathwise estimates
5.8 calculations in vba
problems
part ii advanced option pricing
6 foreign exchange
6.1 currency options
6.2 options on foreign assets struck in foreign currency
6.3 options on foreign assets struck in domestic currency
6.4 currency forwards and futures
6.5 quantos
6.6 replicating quantos
6.7 quanto forwards
6.8 quanto options
6.9 return swaps
6.10 uncovered interest parity
problems
7 forward, futures, and exchange options
7.1 margrabe's formula
7.2 black's formula
7.3 merton's formula
7.4 deferred exchange options
7.5 calculations in vba
7.6 greeks and hedging
7.7 the relation of futures prices to forward prices
7.8 futures options
7.9 time-varying volatility
7.10 hedging with forwards and futures
7.11 market completeness
problems
8 exotic options
8.1 forward-start options
8.2 compound options
8.3 american calls with discrete dividends
8.4 choosers
8.5 options on the max or min
8.6 barrier options
8.7 lookbacks
8.8 basket and spread options
8.9 asian options
8.10 calculations in vba
problems
9 more on monte carlo and binomial valuation
9.1 monte carlo models for path-dependent options
9.2 binomial valuation of basket and spread options
9.3 monte carlo valuation of basket and spread options
9.4 antithetic variates in monte carlo
9.5 control variates in monte carlo
9.6 accelerating binomial convergence
9.7 calculations in vba
problems
10 finite difference methods
10.1 fundamental pde
10.2 discretizing the pde
10.3 explicit and implicit methods
10.4 crank-nicolson
10.5 european options
10.6 american options
10.7 barrier options
10.8 calculations in vba
problems
part iii fixed income
11 fixed income concepts
11.1 the yield curve
11.2 libor
11.3 swaps
11.4 yield to maturity, duration, and convexity
11.5 principal components
11.6 hedging principal components
problems
12 introduction to fixed income derivatives
12.1 caps and floors
12.2 forward rates
12.3 portfolios that pay spot rates
12.4 the market model for caps and floors
12.5 the market model for european swaptions
12.6 a comment on consistency
12.7 caplets as puts on discount bonds
12.8 swaptions as options on coupon bonds
12.9 calculations in vba
problems
13 valuing derivatives in the extended vasicek model
13.1 the short rate and discount bond prices
13.2 the vasicek mode]
13.3 estimating the vasicek model
13.4 hedging in the vasicek model
13.5 extensions of the vasicek model
13.6 fitting discount bond prices and forward rates
13.7 discount bond options, caps and floors
13.8 coupon bond options and swaptions
13.9 captions and floortions
13.10 yields and yield volatilities
13.11 the general hull-white model
13.12 calculations in vba
problems
14 a brief survey of term structure models
14.1 ho-lee
14.2 black-derman-toy
14.3 black-karasinski
14.4 cox-ingersoll-ross
14.5 longstaff-schwartz
14.6 heath-jarrow-morton
14.7 market models again
problems
ppendices
a programming in vba
a.1 vba editor and modules
a.2 subroutines and functions
a.a message box and input box
a.4 writing to and reading from ceils
a.5 variables and assignments
a.6 mathematical operations
a.7 random numbers
a.8 for loops
a.9 while loops and logical expressions
a.10 if, else, and elseif statements
a.11 variable declarations
a.12 variable passing
a.13 arrays
a.14 debugging
b miscellaneous facts about continuous-time models
b.1 girsanov's theorem
b.2 the minimum of a geometric brownian motion
b.3 bessel squared processes and the cir model
list of programs
list of symbols
references
index
前言/序言
衍生证券教程:理论和计算 电子书 下载 mobi epub pdf txt
电子书下载地址:
相关电子书推荐:
- 文件名
- 正版 数学和数学家的故事.第8册
- 中国近现代名家精品丛书:牛振国作品精选 牛振国 绘 天津杨柳青画社
- 走近科学--功夫动物1-1
- 微光尘埃+雕刻时光 减压手工绘画
- 安全-危险没什么了不起-1
- 卓有成效的团队管理(原书第3版)
- 小数与分数.算式计算-小牛顿数学王
- 餐饮开店全程运作实战手册+餐饮开店赚钱的18个关键+餐饮开店经营实战:厨房综合管理
- 正版 十万个为什么:新版(全四册)(无盒) 9787553428116 常士杰 吉林出版集
- 包邮 互联网+物流+快递时代3.0 物流行业专家李芏巍全新力作 中国快递行业发展趋势书籍
- 正版 十万个为什么:新版(全四册)(无盒) 9787553428116 常士杰 吉林出版集
- 正版现货 麦肯锡精英重视的55个高效能沟通习惯+新人逻辑思考9堂课 时间分配法 全套2册麦
- 昆虫记(插图版) 9787538869576 (法)法布尔-RT
- 卖什么都是卖体验:互联网时代必学的39条客户体验法则 中信出版社
- 儿童百科全书(千姿百态的生活学生版)/探索天下