政大機構典藏-National Chengchi University Institutional Repository(NCCUR):Item 140.119/31219
English  |  正體中文  |  简体中文  |  Post-Print筆數 : 27 |  全文筆數/總筆數 : 113318/144297 (79%)
造訪人次 : 51094703      線上人數 : 863
RC Version 6.0 © Powered By DSPACE, MIT. Enhanced by NTU Library IR team.
搜尋範圍 查詢小技巧:
  • 您可在西文檢索詞彙前後加上"雙引號",以獲取較精準的檢索結果
  • 若欲以作者姓名搜尋,建議至進階搜尋限定作者欄位,可獲得較完整資料
  • 進階搜尋
    政大機構典藏 > 商學院 > 金融學系 > 學位論文 >  Item 140.119/31219
    請使用永久網址來引用或連結此文件: https://nccur.lib.nccu.edu.tw/handle/140.119/31219


    題名: 跨國經濟體系下Quanto Range Accrual Notes的評價與避險
    Pricing and Hedging of Quanto Range Accrual Notes under Gaussian HJM with Cross- Currency Levy Processes
    作者: 徐保鵬
    Hsu, Pao Peng
    貢獻者: 廖四郎
    Liao, Szu Lang
    徐保鵬
    Hsu, Pao Peng
    關鍵詞: 區間票息債券
    Range Accrual Notes
    Compound-Poisson jump
    Hedging Strategy
    日期: 2008
    上傳時間: 2009-09-14 09:33:18 (UTC+8)
    摘要: This dissertation analyzes the pricing and hedging problems for quanto range accrual note under the HJM-framework with Levy processes for instantaneous domestic and foreign forward interest rates. We consider both the effects of jump risks of interest rate and exchange rate on the pricing of the notes.
    The pricing formula for quanto double interest rate digital option and quanto contingent payoff option are first derived, then we apply the method proposed by Turnbull(1995) to duplicate the qaunto range accrual note by a combination of the quanto double interest rate digital option and the qunato contingent payoff option. Furthermore, using the pricing formulas derived in this paper, we obtain the hedging position for each issue of range accrual notes.
    In addition, by simulation and assuming the jump to be compound Poisson process, we further analyze the effects of jump risk and exchange rate risk on the coupons receivable in holding a range accrual note.
    This dissertation analyzes the pricing and hedging problems for quanto range accrual note under the HJM-framework with Levy processes for instantaneous domestic and foreign forward interest rates. We consider both the effects of jump risks of interest rate and exchange rate on the pricing of the notes.
    The pricing formula for quanto double interest rate digital option and quanto contingent payoff option are first derived, then we apply the method proposed by Turnbull(1995) to duplicate the qaunto range accrual note by a combination of the quanto double interest rate digital option and the qunato contingent payoff option. Furthermore, using the pricing formulas derived in this paper, we obtain the hedging position for each issue of range accrual notes.
    In addition, by simulation and assuming the jump to be compound Poisson process, we further analyze the effects of jump risk and exchange rate risk on the coupons receivable in holding a range accrual note.
    參考文獻: 1.Bates, D. S. (1996). Jumps and stochastic volatility: Exchange rate processes implicit in deutsche mark options. Review of Financial Studies, 9, 69-107.
    2.Bates, D. S. (2000). Post-’87 crash fears in the S&P 500 futures option market. Journal of Econometrics, 94, 181-238.
    3.Björk, T., Kabanov, Y., & Runggaldier, W. (1997). Bond market structure in the presence of marked point processes. Mathematical Finance, 7(2), 211-223.
    4.Brace, A., Gatarek, D. & Musiela, M. (1997). The Market Model of Interest Rate Dynamics. Mathematical Finance, 7, 127-147.
    5.Carr, P., & Madan, D. B. (1999). Option valuation using the fast Fourier transform. Journal of Computational Finance, 2, 61-73.
    6.Cox, J. C., Ingersoll. J. E. & Ross, S. A. (1985). A Theory of the Term Structure of Interest Rates. Econometrica, 53(2), 385-408.
    7.Cont, R., & Tankov, P. (2004). Financial modelling with jump processes. CRC Press.
    8.Das, S. R. (1995). Jump-Diffusion processes and the bond markets. Working paper, Santa Clara University.
    9.Das, S. R. (2002). The surprise element: Jumps in interest rates. Journal of Econometrics, 106, 27-65.
    10.Driessen, J., Klaassen, P., & Melenberg, B. (2000). The performance of multi-factor term structure models for pricing and hedging caps and swaptions. Working paper, Tilburg University.
    11.Dwyer, G. P., & Hafer, R. W. (1989). Interest rates and economic announcements. Technical report, Federal Reserve Bank of St. Louis.
    12.Eberlein, E., & Raible, S. (1999). Term structure models driven by general Levy processes. Mathematical Finance, 9, 31-53.
    13.Eberlein, E., & Ozkan, F. (2005). The Levy Libor model. Finance and Stochastic, 9, 372-348.
    14.Eberlein, E., & Kluge, W. (2006). Valuation of floating range notes in Levy term-structure models. Mathematical Finance, 16(2), 237-54.
    15.Gibson, R., & Schwartz, E. S. (1990). Stochastic Convenience Yield And the Pricing of Oil Contingent Claims. Journal of Finance, 45(3), 959-976.
    16.Glasserman, P., & Kou, S. G. (2003). The term structure of simple forward rates with jump Risk. Mathematical Finance, 13(3), 383-410.
    17.Hardouvelis, G. A. (1988). Economic news, exchange rates and interest rates. Journal of International Money and Finance, 7(1), 23-35.
    18.Heston, S. L. (1995). A model of discontinuous interest rate behaviour, yield curves and volatility. Working Paper, University of Maryland.
    19.Huang, S.C., & Hung, M. W. (2005). Pricing foreign equity options under Levy processes. The Journal of Futures Markets, 25 (10), 917-944.
    20.Hull, J. & White, A. (1990). Pricing Interest Rate Derivative Securities. Review of Financial Studies. 3, 573-592.
    21.Jarrow, R. A., & Turnbull, S. M. (1994). Delta, gamma and bucket hedging of interest rate derivatives. Applied Mathematical Finance, 1, 21-48.
    22.Jiang, G. J. (1998). Jump-Diffusion Model of Exchange Rate Dynamics Estimation Via Indirect Inference. Issues in Computational Economics and Finance, edited by S. Holly and S. Greenblatt, Amsterdam: Elsevier.
    23.Johnson, G. & Schneeweis, T. (1994). Jump-Diffusion Processes in the Foreign Exchange Markets and the Release of Macroeconomic News. Computational Economics, 7, 309-329.
    24.Jorion, P. (1988). On Jump Processes in the Foreign Exchange and Stock Markets. Review of Financial Studies, 1, 427-445.
    25.Koval, N. (2005). Time-inhomogeneous Lévy processes in cross-currency market models. Dissertation. Universität Freiburg
    26.Merton, R. C. (1976). Option pricing when underlying stock returns are discontinuous. Journal of Financial Economics, 3, 125-144.
    27.Naik, V., & Lee, M. (1990). General equilibrium pricing of options on the market portfolio with discontinuous returns. Review of Financial Studies, 3, 493-521.
    28.Navatte, P., & Quittard-Pinon, F. (1999). The valuation of interest rate digital options and range notes revisited. European Financial Management, 5(3), 425-440.
    29.Nunes, J. P. V. (2004). Multifactor valuation of floating range notes. Mathematical Finance, 14(1), 79-97.
    30.Park, K., Kim, M. & Kim, S. (2006). On Monte Carlo Simulation for the HJM Model Based on Jump. Lecture Notes in Computer Science, 38-45.
    31.Raible, S. (2000). Lévy processes in finance: theory, numerics, and empirical Facts. Dissertation. Universität Freiburg
    32.Reiner, E. (1992). Quanto mechanics. Risk, 5(3), 59-63.
    33.Shirakawa, H. (1991). Interest rate option pricing with Poisson-Gaussian forward rate curve processes. Mathematical Finance, 1(4), 77-94.
    34.Strickland, C. (1996). A Comparison of Models of the Term Structure. Journal of European Finance, 2, 261-287.
    35.Takahashi, A., Takehara, K. & Yamazaki, A. (2006). Pricing Currency Options with a Market Model of Interest Rates under Jump-Diffusion Stochastic. CIRJE Discussion Papers.
    36.Turnbull, S. (1995). Interest rate digital options and range notes. Journal of Derivatives, 3(2), 92-101.
    37.Vasicek, O. (1977). An equilibrium characterization of the term structure. Journal of financial Economics, 5, 177-188.
    38.Zhang, B. (2006). A new Levy based short rate model for the fixed income market and its estimation with particle filter. Dissertation. University of Maryland.
    描述: 博士
    國立政治大學
    金融研究所
    91352502
    97
    資料來源: http://thesis.lib.nccu.edu.tw/record/#G0913525021
    資料類型: thesis
    顯示於類別:[金融學系] 學位論文

    文件中的檔案:

    檔案 大小格式瀏覽次數
    index.html0KbHTML2212檢視/開啟


    在政大典藏中所有的資料項目都受到原著作權保護.


    社群 sharing

    著作權政策宣告 Copyright Announcement
    1.本網站之數位內容為國立政治大學所收錄之機構典藏,無償提供學術研究與公眾教育等公益性使用,惟仍請適度,合理使用本網站之內容,以尊重著作權人之權益。商業上之利用,則請先取得著作權人之授權。
    The digital content of this website is part of National Chengchi University Institutional Repository. It provides free access to academic research and public education for non-commercial use. Please utilize it in a proper and reasonable manner and respect the rights of copyright owners. For commercial use, please obtain authorization from the copyright owner in advance.

    2.本網站之製作,已盡力防止侵害著作權人之權益,如仍發現本網站之數位內容有侵害著作權人權益情事者,請權利人通知本網站維護人員(nccur@nccu.edu.tw),維護人員將立即採取移除該數位著作等補救措施。
    NCCU Institutional Repository is made to protect the interests of copyright owners. If you believe that any material on the website infringes copyright, please contact our staff(nccur@nccu.edu.tw). We will remove the work from the repository and investigate your claim.
    DSpace Software Copyright © 2002-2004  MIT &  Hewlett-Packard  /   Enhanced by   NTU Library IR team Copyright ©   - 回饋