1 / 32

Pricing Model of Financial Engineering

Pricing Model of Financial Engineering . Fang-Bo Yeh System Control Group Department of Mathematics Tunghai University www.math.thu.tw/~fbyeh/. 葉芳柏 教授 英國 Glasgow 大學 數學博士. 專長 控制工程理論、科學計算模擬、飛彈導引、泛函分析、財務金融工程 現任 東海大學數學系教授

nevan
Download Presentation

Pricing Model of Financial Engineering

An Image/Link below is provided (as is) to download presentation Download Policy: Content on the Website is provided to you AS IS for your information and personal use and may not be sold / licensed / shared on other websites without getting consent from its author. Content is provided to you AS IS for your information and personal use only. Download presentation by click this link. While downloading, if for some reason you are not able to download a presentation, the publisher may have deleted the file from their server. During download, if you can't get a presentation, the file might be deleted by the publisher.

E N D

Presentation Transcript


  1. Pricing Model of Financial Engineering Fang-Bo Yeh System Control Group Department of Mathematics Tunghai University www.math.thu.tw/~fbyeh/

  2. 葉芳柏 教授 英國 Glasgow大學 數學博士 專長 控制工程理論、科學計算模擬、飛彈導引、泛函分析、財務金融工程 現任 東海大學數學系教授 國立交通大學應用數學研究所, 財務金融研究所兼任教授 亞洲控制工程學刊編輯. 歷任 1. 英國Glasgow大學數學系客座教授 2. 英國Newcastle大學數學統計系客座教授 3. 英國Oxford大學財務金融中心研究 4. 荷蘭國立Groningen大學資訊數學系客座授 5. 日本國立大阪大學電子機械控制工程系客座教授 6. 成功大學航空太空研究所兼任教授 7. 航空發展中心顧問 8. 東海大學數學系主任、所長、理學院院長、教務長 9. 國科會中心學門審議委員、諮議委員 10. 教育部大學評鑑委員 11. 國際數學控制學刊編輯委員 學術獎勵 1. 國際電機電子工程師學會獎 IEEE M. Barry Carlton Award 2. 國際航空電子系統傑出論文獎 3. 國科會傑出研究獎

  3. Contents 1. Classic and Derivatives Market 2. Derivatives Pricing 3. Methods for Pricing 4. Numerical Solution for Pricing Model

  4. Underlying Assets Cash Commodities ( wheat, gold ) Fixed income ( T-bonds ) Stock Equities ( AOL stock ) Equity indexes ( S&P 500 ) Currency Currencies ( GBP, JPY ) Contracts Forward & Swap: FRAs , Caps, Floors, Interest Rate Swaps Futures & Options : Options, Convertibles Bond Option, Swaptions Classic and Derivatives Market

  5. Derivative Securities • Forward Contract : is an agreement to buy or sell. • Call Option : gives its owner the right but not the obligation to buy a specified asset on or before a specified date for a specified price. European, American, Lookback, Asian, Capped, Exotics…..

  6. on Sep. 8, you buy one Nov.call option contract written on AOL contract size: 100 shares strike price: 80 maturity: December 26 option premium: 71/8 per share on Sep.8,… you pay the premium of $712.50 at maturity on December 26,… ifyou exercise the option, you take delivery of 100 shares of AOL stock and pay the strike price of $8,000 otherwise, nothing happens Call Option on AOL Stock

  7. Call Option on AOL Stock denote by ST the price of AOL stock on December 26 date Sep. 8 December 26 scenario (if ST < 80) (if ST 80) exercise option? no yes cash flows (on per-share basis) pay option premium -7.125  receive stock  ST pay strike price  -80

  8. Fang-bo Yeh Call Option on AOL Stock pay-off profit pay-off net profit AOL stock price 0 60 70 80 90 100 on December 26 7.125

  9. Mathematics Finance 2003 Option Markets Maximal Losses and Gains on Option Positions short call maximal gain: premium maximal loss: unlimited long call maximal gain: unlimited maximal loss: premium 0 0 short put maximal gain: premium maximal loss: strike minus premium long put maximal gain: strike minus premium maximal loss: premium 0 0 Fang-Bo Yeh Tunghai Mathematics

  10. covered call: the potential loss on a short call position is unlimited the worst case occurs when the stock price at maturity is very high and the option is exercised the easiest protection against this case is to buy the stock at the same time as you write the option this strategy is called “covered call” covered call pay-offs: Cost of strategy: you receive the option premium C while paying the stock price S the total cost is hence S-C Mathematics Finance 2003 Option Markets Simple Option Strategies: Covered Call cash flows at maturity case: ST< K ST K Short call - K-ST long stock ST ST total: ST K Fang-Bo Yeh Tunghai Mathematics

  11. Mathematics Finance 2003 Option Markets Simple Option Strategies: Covered Call pay-off K short call profit premium 0 + long stock ST K = covered call K Fang-Bo Yeh Tunghai Mathematics

  12. protective put: suppose you have a long position in some asset, and you are worried about potential capital losses on your position to protect your position, you can purchase an at-the-money put option which allows you to sell the asset at a fixed price should its value decline this strategy is called “protective put” protective put pay-offs: cost of strategy: the additional cost of protection is the price of the option, P the total cost is hence S+P Mathematics Finance 2003 Option Markets Simple Option Strategies: Protective Put cash flows at maturity case: ST< K ST K long stock ST ST long put K-ST - total: K ST Fang-Bo Yeh Tunghai Mathematics

  13. Mathematics Finance 2003 Option Markets Simple Option Strategies: Protective Put pay-off long stock K 0 + long put premium ST K profit = protective put K Fang-Bo Yeh Tunghai Mathematics

  14. Financial Engineering • Bond + Single Option S&P500 Index Notes • Bond + Multiple Option Floored Floating Rate Bonds, Range Notes • Bond + Forward (Swap) ;Structured Notes Inverse Floating Rate Note • Stock + Option Equity-Linked Securities, ELKS

  15. Main Problem: What is the fair price for the contract? Ans: (1). The expected value of the discounted future stochastic payoff (2). It is determined by market forces which is impossible have a theoretical price

  16. Main result: • It is possible • have a theoretical price which is consistent with the underlying prices given by the market • But • is not the same one as in answer (1).

  17. Risk neutral valuation and solving conditional expectation of the random variable The elimination of randomness and solving diffusion equation MethodsAssume efficient market

  18. Problem Formulation Contract F : Underlying asset S, return Future time T, future pay-off f(ST) Riskless bond B, return Find contract value F(t, St)

  19. Deterministic Stochastic Differentiable Not differentiable

  20. Deterministic Function

  21. Stochastic Brownian Motion

  22. From Calculus to Stochastic Calculus CalculusStochastic Calculus Differentiation Ito Differentiation Integration Ito Integration StatisticsStochastic Process Distribution Measure Probability Equivalent Probability

  23. Assume 1). The future pay-off is attainable: (controllable) exists a portfolio such that 2). Efficient market: (observable) If then

  24. By assumptions (1)(2) Ito’s lemma The Black-Scholes-Merton Equation:

  25. European Call Option Price:

  26. Martingale Measure CMG Drift Brownian Motion Brownian Motion

  27. Where

  28. Main Result The fair price is the expected value of the discounted future stochastic payoff under the new martingale measure.

  29. From Real world to Martingale world Discounted Asset Price & Derivatives Price Under Real World Measure is not Martingale But Under Risk Neutral Measure is Martingale

  30. Numerical Solution Methods Finite DifferenceMonte Carlo Simulation • Idea: Idea: Approximate differentials Monte Carlo Integration by simple differences via Generating and sampling Taylor series Random variable

  31. Introduction to Financial Mathematics (1) Topics for 2003: 1.Pricing Model for Financial Engineering. 2. Asset Pricing and Stochastic Process. 3. Conditional Expectation and Martingales. 4. Risk Neutral Probability and Arbitrage Free Principal. 5. Black-Scholes Model : PDE and Martingale and Ito’s Calculus. 6. Numerical method and Simulations.

  32. References • M. Baxter, A. Rennie , Financial Calculus,Cambridge university press, 1998 • R.J. Elliott and P.E. Kopp, Mathematics of Financial Markets, Springer Finance, 2001 • N.H. Bingham and R. Kiesel , Risk Neutral Evaluation, Springer Finance, 2000. • P. Wilmott, Derivatives, John Wiley and Sons, 1999. • J.C. Hull , Options, Futures and other derivatives, Prentice Hall. 2002. • R. Jarrow and S. Turnbull, Derivatives Securities, Southern College Publishing, 1999.

More Related