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政大機構典藏 > 商學院 > 金融學系 > 學位論文 > Item 140.119/33991

Please use this identifier to cite or link to this item: https://nccur.lib.nccu.edu.tw/handle/140.119/33991

Title:	可贖回雪球式商品的評價與避險
Authors:	曹若玹
Contributors:	廖四郎曹若玹
Keywords:	利率連動債券最小平方蒙地卡羅參數校準提前贖回避險參數 BGM LFM LIBOR Greeks calibration snowball Sausage Monte Carlo pathwise
Date:	2005
Issue Date:	2009-09-17 19:02:32 (UTC+8)
Abstract:	本文採用Lognormal Forward LIBOR Model (LFM) 利率模型，針對可贖回雪球式債券進行相關的評價與避險分析，而由於此商品的計息方式為路徑相依型態，價格沒有封閉解，故必須利用數值方法來進行評價。過去通常使用二元樹或三元樹的方法來評價具有可贖回特性的商品，但因為LFM是屬於多因子模型，所以不容易處理建樹的過程。而一般路徑相依商品的評價是使用蒙地卡羅法來進行，但是標準的蒙地卡羅法不易處理美式或百慕達式選擇權的問題，因此，本研究將使用由Longstaff and Schwartz(2001)所提出的最小平方蒙地卡羅法，來處理同時具有可贖回與路徑相依特性的商品評價並進行實證研究。 <br>此外，關於可贖回商品的避險參數部分，由於商品的價格函數不具有連續性，若在蒙地卡羅法之下直接使用重新模擬的方式來求算避險參數，將會造成不準確的結果，而Piterbarg (2004)提出了兩種可用來計算在LFM下可贖回商品避險參數的方法，其實証結果發現所求出的避險參數結果較準確，因此本研究將此方法運用至可贖回雪球式利率連動債券，並分析各種參數變化對商品價格的影響大小，便於進行避險工作。
Reference:	[1] Brace, A., D. Gatarek and M. Musiela (1997). The Market Model of Interest Rate . Dynamics Mathematical Finance 7, 127-155. [2] Brigo, D. and F. Mercurio (2001). Interest Models, Theory and Practice. Springer-Verlag. [3] Carol Alexander(2003). Common Correlation and Calibrating the Lognormal Forward Rate Model . ISMA Discussion Papers in Finance 2002-18. To appear in Wilmott Magazine. [4] Glasserman, P. (2004). Monte Carlo Method in Financial Engineering. New York,Springer. [5] Glasserman, P., and X., Zhao (1999). Fast Greeks by Simulation in Forward LIBOR Models, Journal of Computational Finance 3, 5-39. [6] Glasserman, P., and Yu, B.(2004). Number of Paths Versus Number of Basis Functions in American Option Pricing. Annuals of Applied Probability 14(4), 2090-2119. [7] Jamshidian, F. (1997). LIBOR and Swap Market Models and Measures . Finance and Stochastics 1, 293-330. [8] Longstaff, F. and Schwartz, E. (2001).Valuing American Options by Simulation: A Simple Least-Squares Approach. The Review of Financial Studies, Vol. 14, No.1, p.113-147. [9] Piterbarg.V.V.(2003). A Practioner’s Guide to Pricing and hedging Callable Libor Exotics in Forward Libor Models, SSRN Working Paper. [10] Piterbarg.V.V.(2004a). Computing Deltas of Callable Libor Exotics in Forward Libor Models. Journal of Computational Finance 7(3),107-144. [11] Piterbarg.V.V.(2004b). Pricing and Hedging Callable Libor Exotics in Forward Libor Models. Journal of Computational Finance 8(2), 65-117. [12] Rebonato, R. (1998). Interest Rate Option Models. Second Edition. Wiley, Chichester. [13] Rebonato, R. (1999). Volatility and Correlation: In the Pricing of Equity, FX and Interest-Rate Options, John Wiley & Sons Ltd., West Sussex. [14] Rebonato, R.(1999). On the Simultaneous Calibration of Multifactor Lognormal Interest Rate Models to Black Volatilities and to the Correlation Matrix, The Journal of Computational Finance,2, 5-27. [15] Rebonato, R (2002), Modern Pricing of Interest-Rate DerivativesL:The LIBOR Market Model and Beyond. Princeton University. Press, Princeton. [16] Schoenmakers, J. and C., Coffet (2000). Stable Implied Calibration of a Multi-factor Libor Model via a Semi-parametric Correlation Structure, Weierstress Institute Preprint no.611. [17] Shreve, S. (2004). Stochastic Calculus for Finance II, Springer-Verlag, New York. [18] Svoboda, S. (2004). Interest Rate Modelling , Palgrave Macmillan, New York.
Description:	碩士國立政治大學金融研究所 93352009 94
Source URI:	http://thesis.lib.nccu.edu.tw/record/#G0093352009
Data Type:	thesis
Appears in Collections:	[金融學系] 學位論文

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