政大機構典藏-National Chengchi University Institutional Repository(NCCUR):Item 140.119/135941

政大機構典藏-National Chengchi University Institutional Repository(NCCUR):Item 140.119/135941

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政大機構典藏 > 商學院 > 金融學系 > 學位論文 > Item 140.119/135941

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题名:	GSMM模型下可贖回固定期限交換價差區間計息型商品評價與敏感度分析 Valuation and Sensitivity Analysis of Callable Range Accrual Linked to CMS Spread under Generalized Swap Market Models
作者:	黃子瑋 Huang, Zi-Wei
贡献者:	林士貴 Lin, Shih-Kuei 黃子瑋 Huang, Zi-Wei
关键词:	利率衍生性商品固定期限交換利率區間計息型商品一般化交換利率市場模型最小平方蒙地卡羅模擬法敏感度分析 Interest Rate Derivative Constant Maturity Swap Range Accrual Generalized Swap Market Model Least Squares Monte Carlo Simulation Sensitivity Analysis
日期:	2021
上传时间:	2021-07-01 18:04:02 (UTC+8)
摘要:	因應現今金融市場環境，以及高資產客戶或機構法人在避險和風險管理上的需求，相關利率類衍生性金融商品的交易量也快速地成長。此外，在巴賽爾銀行監督委員會 (Basel Committee on Banking Supervision, BCBS) 之「交易簿的基礎原則審視」(Fundamental Review of the Trading Book, FRTB) 新規範下，對於市場風險之管控和估計也更加重視。本論文以市場上常見可贖回固定期限交換 (Constant Maturity Swap, CMS) 利率價差區間計息型商品做為評價對象，透過一般化交換市場模型 (Generalized Swap Market Model, GSMM)，以及最小平方蒙地卡羅法 (Least Squares Monte Carlo method, LSMC) 計算商品之模擬價值，並進行敏感度分析 (Sensitivity analysis) 求得相關避險參數，最後從商品的評價面以及風險管理面做相關之研究分析。 In the recent financial market environment, relevant interest rate derivatives have grown rapidly because of the needs of high net worth individuals and institutional investors for hedging and risk management purposes. Moreover, in the new norm of FRTB established by BCBS, it pays more attention to market risk management and measurement. In this paper, we price the product of interest rate derivatives for the callable range accrual linked to CMS spread which is the common financial instrument traded in the market by LSMC under GSMMs. Additionally, we evaluate the value of this product and calculate the relevant Greeks by sensitivity analysis. Finally, we discuss and analyze the empirical results from valuation and risk management sides.
參考文獻:	中文部分 1.王韋之 (2020)。可贖回 CMS 價差區間計息型商品之評價分析 : 基於 LFM 與最小平方蒙地卡羅法之模擬加速實證。國立政治大學金融研究所碩士論文。 2.陳松男 (2006)。利率金融工程學-理論模型及實務應用。台北：新陸書局。英文部分 1.Benmakhlouf Andaloussi, M. (2019). The Swap Market Model with Local Stochastic Volatility. In. 2.Black, F., Derman, E., & Toy, W. (1990). A one-factor model of interest rates and its application to treasury bond options. Financial Analysts Journal, 46(1), 33-39. 3.Boyle, P. P. (1977). Options: A monte carlo approach. Journal of Financial Economics, 4(3), 323-338. 4.Boyle, P. P. (1988). A lattice framework for option pricing with two state variables. Journal of Financial and Quantitative Analysis, 1-12. 5.Brace, A., Gatarek, D., & Musiela, M. (1997). The market model of interest rate dynamics. Mathematical Finance, 7(2), 127-155. 6.Brigo, D., & Mercurio, F. (2007). Interest rate models-theory and practice: with smile, inflation and credit: Springer Science & Business Media. 7.Broadie, M., & Glasserman, P. (2004). A stochastic mesh method for pricing high-dimensional American options. Journal of Computational Finance, 7, 35-72. 8.Chen, R.-R., Hsieh, P.-L., & Huang, J. (2018). It is time to shift log-normal. The Journal of Derivatives, 25(3), 89-103. 9.Cox, J. C., Ingersoll Jr, J. E., & Ross, S. A. (1985). A Theory of the Term Structure of Interest Rates. Econometrica, 53(2), 385-407. 10.Cox, J. C., Ross, S. A., & Rubinstein, M. (1979). Option pricing: A simplified approach. Journal of Financial Economics, 7(3), 229-263. 11.Galluccio, S., Ly, J. M., Huang, Z., & Scaillet, O. (2007). Theory and calibration of swap market models. Mathematical Finance, 17(1), 111-141. 12.Heath, D., Jarrow, R., & Morton, A. (1992). Bond pricing and the term structure of interest rates: A new methodology for contingent claims valuation. Econometrica: Journal of the Econometric Society, 77-105. 13.Ho, T. S., & Lee, S. B. (1986). Term structure movements and pricing interest rate contingent claims. The Journal of Finance, 41(5), 1011-1029. 14.Hull, J., & White, A. (1990). Pricing interest-rate-derivative securities. The Review of Financial Studies, 3(4), 573-592. 15.Jamshidian, F. (1997). LIBOR and swap market models and measures. Finance and Stochastics, 1(4), 293-330. 16.Kamrad, B., & Ritchken, P. (1991). Multinomial approximating models for options with k state variables. Management Science, 37(12), 1640-1652. 17.Longstaff, F. A., & Schwartz, E. S. (2001). Valuing American options by simulation: a simple least-squares approach. The Review of Financial Studies, 14(1), 113-147. 18.Moreno, M., & Navas, J. F. (2003). On the robustness of least-squares Monte Carlo (LSM) for pricing American derivatives. Review of Derivatives Research, 6(2), 107-128. 19.Parkinson, M. (1977). Option pricing: the American put. The Journal of Business, 50(1), 21-36. 20.Rebonato, R. (2005). Volatility and correlation: the perfect hedger and the fox: John Wiley & Sons. 21.Rendleman, R. J. (1979). Two-state option pricing. The Journal of Finance, 34(5), 1093-1110. 22.Tilley, J. A. (1993). Valuing American options in a path simulation model. Paper presented at the Transactions of the Society of Actuaries. 23.Vasicek, O. (1977). An equilibrium characterization of the term structure. Journal of Financial Economics, 5(2), 177-188. 24.Zhu, J. (2007). Generalized swap market model and the valuation of interest rate derivatives. Available at SSRN 1028710.
描述:	碩士國立政治大學金融學系 108352024
資料來源:	http://thesis.lib.nccu.edu.tw/record/#G0108352024
数据类型:	thesis
DOI:	10.6814/NCCU202100584
显示于类别:	[金融學系] 學位論文

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