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Financial Risk Management

Learn about risk factors, VaR methods, historical simulations, variance-covariance, and more in financial risk management. Understand how to measure and manage financial risks effectively.

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Financial Risk Management

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  1. Financial Risk Management Zvi Wiener Following P. Jorion,Financial Risk Manager Handbook FRM

  2. Chapter 17VaR Methods Following P. Jorion 2001 Financial Risk Manager Handbook FRM

  3. Risk Factors There are many bonds, stocks and currencies. The idea is to choose a small set of relevant economic factors and to map everything on these factors. • Exchange rates • Interest rates (for each maturity and indexation) • Spreads • Stock indices Zvi Wiener

  4. How to measure VaR • Historical Simulations • Variance-Covariance • Monte Carlo • Analytical Methods • Parametric versus non-parametric approaches Zvi Wiener

  5. Historical Simulations • Fix current portfolio. • Pretend that market changes are similar to those observed in the past. • Calculate P&L (profit-loss). • Find the lowest quantile. Zvi Wiener

  6. Example Assume we have $1 and our main currency is SHEKEL. Today $1=4.30. Historical data: 4.00 4.20 4.20 4.10 4.15 P&L 0.215 0 -0.112 0.052 4.30*4.20/4.00 = 4.515 4.30*4.20/4.20 = 4.30 4.30*4.10/4.20 = 4.198 4.30*4.15/4.10 = 4.352 Zvi Wiener

  7. USD NIS 2000 100 -120 2001 200 100 2002 -300 -20 2003 20 30 today Zvi Wiener

  8. today USD: +1% +1% +1% +1% NIS: +1% 0% -1% -1% Changes in IR Zvi Wiener

  9. 1% of worst cases Returns year Zvi Wiener

  10. VaR1% 1% Profit/Loss VaR Zvi Wiener

  11. Variance Covariance • Means and covariances of market factors • Mean and standard deviation of the portfolio • Delta or Delta-Gamma approximation • VaR1%= P – 2.33 P • Based on the normality assumption! Zvi Wiener

  12. 1% 2.33  Variance-Covariance -2.33 Zvi Wiener

  13. Monte Carlo Zvi Wiener

  14. Monte Carlo • Distribution of market factors • Simulation of a large number of events • P&L for each scenario • Order the results • VaR = lowest quantile Zvi Wiener

  15. Monte Carlo Simulation Zvi Wiener

  16. Weights Since old observations can be less relevant, there is a technique that assigns decreasing weights to older observations. Typically the decrease is exponential. See RiskMetrics Technical Document for details. Zvi Wiener

  17. Stock Portfolio • Single risk factor or multiple factors • Degree of diversification • Tracking error • Rare events Zvi Wiener

  18. Bond Portfolio • Duration • Convexity • Partial duration • Key rate duration • OAS, OAD • Principal component analysis Zvi Wiener

  19. Options and other derivatives • Greeks • Full valuation • Credit and legal aspects • Collateral as a cushion • Hedging strategies • Liquidity aspects Zvi Wiener

  20. Credit Portfolio • rating, scoring • credit derivatives • reinsurance • probability of default • recovery ratio Zvi Wiener

  21. Reporting Division of VaR by business units, areas of activity, counterparty, currency. Performance measurement - RAROC (Risk Adjusted Return On Capital). Zvi Wiener

  22. Backtesting Verification of Risk Management models. Comparison if the model’s forecast VaR with the actual outcome - P&L. Exception occurs when actual loss exceeds VaR. After exception - explanation and action. Zvi Wiener

  23. Backtesting OK increasing k intervention Green zone - up to 4 exceptions Yellow zone - 5-9 exceptions Red zone - 10 exceptions or more Zvi Wiener

  24. Stress Designed to estimate potential losses in abnormal markets. Extreme events Fat tails Central questions: How much we can lose in a certain scenario? What event could cause a big loss? Zvi Wiener

  25. Local Valuation Simple approach based on linear approximation. Full Valuation Requires repricing of assets. Zvi Wiener

  26. Delta-Gamma Method The valuation is still local (the bond is priced only at current rates). Zvi Wiener

  27. FRM-97, Question 13 An institution has a fixed income desk and an exotic options desk. Four risk reports were produced, each with a different methodology. With all four methodologies readily available, which of the following would you use to allocate capital? A. Simulation applied to both desks. B. Delta-Normal applied to both desks. C. Delta-Gamma for the exotic options desk and the delta-normal for the fixed income desk. D. Delta-Gamma applied to both desks. Zvi Wiener

  28. FRM-97, Question 13 An institution has a fixed income desk and an exotic options desk. Four risk reports were produced, each with a different methodology. With all four methodologies readily available, which of the following would you use to allocate capital? A. Simulation applied to both desks. B. Delta-Normal applied to both desks. C. Delta-Gamma for the exotic options desk and the delta-normal for the fixed income desk. D. Delta-Gamma applied to both desks. Bad question! Zvi Wiener

  29. Mapping Replacing the instruments in the portfolio by positions in a limited number of risk factors. Then these positions are aggregated in a portfolio. Zvi Wiener

  30. Forecast of the covariance matrix for the horizon Delta-Normal method Assumes • linear exposures • risk factors are jointly normally distributed The portfolio variance is Zvi Wiener

  31. Delta-normal Histor. MC Valuation linear full full Distribution normal actual general Extreme events low prob. recent possible Ease of comput. Yes intermed. No Communicability Easy Easy Difficult VaR precision Bad depends good Major pitalls nonlinearity unstable model fat tails risk Zvi Wiener

  32. FRM-97, Question 12 Delta-Normal, Historical-Simulations, and MC are various methods available to compute VaR. If underlying returns are normally distributed, then the: A. DN VaR will be identical to HS VaR. B. DN VaR will be identical to MC VaR. C. MC VaR will approach DN VaR as the number of simulations increases. D. MC VaR will be identical to HS VaR. Zvi Wiener

  33. FRM-97, Question 12 Delta-Normal, Historical-Simulations, and MC are various methods available to compute VaR. If underlying returns are normally distributed, then the: A. DN VaR will be identical to HS VaR. B. DN VaR will be identical to MC VaR. C. MC VaR will approach DN VaR as the number of simulations increases. D. MC VaR will be identical to HS VaR. Zvi Wiener

  34. FRM-98, Question 6 Which VaR methodology is least effective for measuring options risks? A. Variance-covariance approach. B. Delta-Gamma. C. Historical Simulations. D. Monte Carlo. Zvi Wiener

  35. FRM-98, Question 6 Which VaR methodology is least effective for measuring options risks? A. Variance-covariance approach. B. Delta-Gamma. C. Historical Simulations. D. Monte Carlo. Zvi Wiener

  36. FRM-99, Questions 15, 90 The VaR of one asset is 300 and the VaR of another one is 500. If the correlation between changes in asset prices is 1/15, what is the combined VaR? A. 525 B. 775 C. 600 D. 700 Zvi Wiener

  37. FRM-99, Questions 15, 90 Zvi Wiener

  38. Example On Dec 31, 1998 we have a forward contract to buy 10M GBP in exchange for delivering $16.5M in 3 months. St - current spot price of GBP in USD Ft - current forward price K - purchase price set in contract ft - current value of the contract rt - USD risk-free rate, rt* - GBP risk-free rate  - time to maturity Zvi Wiener

  39. Zvi Wiener

  40. The forward contract is equivalent to a long position of SP* on the spot rate a long position of SP* in the foreign bill a short position of KP in the domestic bill Zvi Wiener

  41. On the valuation date we have S = 1.6595, r = 4.9375%, r* = 5.9688% Vt = $93,581 - the current value of the contract Zvi Wiener

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