1. 99/08/29Jafee 99 Lattice Calculation for Forward LIBOR Model Tadashi Uratani Hosei University uratani@k.hosei.ac.jp and Makoto Utsunomiya Bank of Tokyo-Mitsubishi

2. 99/08/29Jafee 99 Outline Interest rate sensitive security (e.g. Cap) Definitions: Bond Price, LIBOR Forward LIBOR Model –Martingale, No Arbitrage, and –Backward, Forward Induction Method Lattice Calculation Transitional Probability among Measures Valuation of Knockout Cap

3. 99/08/29Jafee 99 Interest rate derivatives E.g. Cap rate date Short term interest （ LIBOR ） Exercise rate Company Bank difference premium difference

4. 99/08/29Jafee 99 LIBOR London Interbank Offer Rate Typical short-term interest rate in international capital market 3 month LIBOR 6 month LIBOR Borrowing date Returning date ３ month

5. 99/08/29Jafee 99 Forward LIBOR and Discount Bond Price Forward LIBOR

6. 99/08/29Jafee 99 Forward LIBOR and Bond Price

7. 99/08/29Jafee 99 Forward LIBOR Model Bond process Ito’s Lemma Valuation of derivatives by Forward LIBOR

8. 99/08/29Jafee 99 Change of Probability Measure Girsanov Theorem

9. 99/08/29Jafee 99 Martingale No Arbitrage Condition Market value of risk

10. 99/08/29Jafee 99 Pricing by Martingale Martingale under

11. 99/08/29Jafee 99 Risk Neutral Measure

12. 99/08/29Jafee 99 Risk Adjusted Measure

13. 99/08/29Jafee 99 Valuation of cap Generation :F. LIBOR Choice :Meas. Backward Forward Lattice martingale

14. 99/08/29Jafee 99 Lattice Calculation Martingale Measures

15. 99/08/29Jafee 99 Transition Probability

16. 99/08/29Jafee 99 Relation of Transition Probabilities

17. 99/08/29Jafee 99 One measure

18. 99/08/29Jafee 99 Knockout Cap rate Year LIBOR Cap contract is knockout

19. 99/08/29Jafee 99

20. 99/08/29Jafee 99 Binominal tree under each measure Calculate the knocknoutUnify one measureValuation of derivative

21. 99/08/29Jafee 99 Knockout Cap Underlying security:3 month LIBOR maturity 3 years knockout cap

22. 99/08/29Jafee 99 fd La fd La fd La fd La Knockout rate Error

23. 99/08/29Jafee 99 Why lambda affect? Large λ Lattice generation

24. 99/08/29Jafee 99 End

25. 99/08/29Jafee 99

26. 99/08/29Jafee 99

27. 99/08/29Jafee 99 Knockout Cap 単純モンテカルロ法 試行回数１００００ 回 時点分割１０ 前進法、後退法多重格子法 ３ヶ月 LIBOR を対象とした３年満期の０時点における価格

28. 99/08/29Jafee 99

29. 99/08/29Jafee 99 Conclusion 異なった測度による推移確率関数を関係付 けることによりいくつかの金利派生証券を 評価 推移確率関数を格子法に利用 Knockout Caplet において λ が大きいとき他の 方法に比べ誤差が大きい – 各格子の作成方法を検討 – 推移確率関数の検討 他の期間同士の Forward LIBOR の推移確率 の導入し、他の派生証券を評価