簡易檢索 / 詳目顯示
| 研究生: |
黃珮菁 |
|---|---|
| 論文名稱: |
路徑相依利率結構型債券之評價 |
| 指導教授: | 廖四郎 |
| 學位類別: |
碩士
Master |
| 系所名稱: |
商學院 - 金融學系 Department of Money and Banking |
| 論文出版年: | 2004 |
| 畢業學年度: | 92 |
| 語文別: | 中文 |
| 論文頁數: | 50 |
| 中文關鍵詞: | 市場模型 、蒙地卡羅模擬法 、路徑相依利率選擇權 |
| 相關次數: | 點閱:87 下載:0 |
| 分享至: |
| 查詢本校圖書館目錄 查詢臺灣博碩士論文知識加值系統 勘誤回報 |
本論文的研究目的是提供路徑相依利率結構型債券一個簡便而實用的評價模型,透過機率測度的轉換,推導出遠期LIBOR利率的動態過程,藉以進行蒙地卡羅的模擬,使用BGM蒙地卡羅法的好處在於只要模擬出未來時點的利率期間結構,無論產品條件如何改變,都可經由調整最後的收益型態,就可快速評價出產品價格。
在實證上,本文評價的商品,為市場上實際發行與銷售的路徑相依利率連動債券,其特色為履約價格的重設為一個路徑函數的型態,藉由推導出的模型方法,對產品訂出理論價格,並建構發行商的避險策略,與避險參數的分析,探討實務上產品發行與風險管理的執行方法。
第一章 緒論
1.1 研究動機
1.2 研究目的
1.3 研究架構
第二章 文獻探討
2.1 利率連動債券發展
2.2 利率訂價模型
第三章 評價模型
3.1 模型設定
3.2 路徑相依利率選擇權型態
第四章 實證研究
4.1 路徑相依利率連動債券報酬與風險分析
4.2 路徑相依利率連動債券之訂價
4.3 波動度結構校準與價格分析
第五章 風險管理
5.1 發行商避險策略分析
5.2 避險參數分析
第六章 結論與建議
參考文獻
1. Amin, K.I. and A. Morton. (1994). Implied volatility functions in arbitrage-free term structure models. Journal of Financial Economics. 35, 141-180.
2. Brace, A., D. Gatarek, and M. Musiela. (1997). The market model of interest rate dynamics. Mathematical Finance. 7, 127-155.
3. Brennan, M.J. and E. Schwartz. (1979). A continuous-time approach to the pricing of bonds. Journal of Banking and Finance. 3, 133-155.
4. Cox, J.C., J.E. Ingersoll, Jr., and S.A. Ross. (1985). A theory of the term structure of interest rates. Econometrica. 53, 385-407.
5. Heath, D., R. Jarrow, and A. Morton. (1990). Bond pricing and the term structure of interest rates: a discrete time approximation. The Journal of Financial andQuantitative Analysis. 25, 419-440.
6. Heath, D., R. Jarrow, and A. Morton. (1991). Contingent claim valuation with a random evolution of interest rates. Review of Futures Market. 9, 54-76.
7. Heath, D., R. Jarrow, and A. Morton. (1992). Bond pricing and the term structure of interest rates: a new methodology for contingent claims valuation. Econometrica. 60, 77-105.
8. Ho, T.S.Y., and S.B. Lee. (1986). Term structure movements and pricing interest rate contingent claims. Journal of Finance. 41, 1011-1029.
9. Hull, J.C. and A. White. (1987). The pricing of options on assets with stochastic volatilities. Journal of Finance. 42, 281-300.
10.Hull, J.C. and A. White. (1990). Pricing interest-rate-derivative securities. Review of Financial Studies. 33, 423-440. 58
11.Hull, J.C. and A. White. (2000). Forward rate volatilities, swap rate volatilities, and implementation of the LIBOR market model. Journal of Fixed Income. 9, 46-62.
12.Jamshidian, F. (1989). An exact bond option pricing formula. Journal of Finance. 44, 205-209.
13.Jamshidian, F. (1997). LIBOR and swap market models and measures. Finance and Stochastics. 1, 293-330.
14.Li, A., P. Ritchken, and L. Sankarasubramanian. (1995). Lattice models for pricing American interest rate claims. Journal of Finance. 50, 719-737.
15.Longstaff, F.A. and E. Schwartz. (1992). Interest rate volatility and the termstructure: a two-factor general equilibrium model. Journal of Finance. 47, 1259-1282.
16.Miltersen, K., K. Sandmann, and D. Sondermann. (1997). Closed form solutions for term structure derivatives with lognormal interest rates. Journal of Finance. 52, 409-430.
17.Musiela, M., Rutkowski, M. (1997). Continuous-time Term Structure Models: Forward Measure Approach. Finance and Stochastics. 1 261-292
18.Ritchken, P. and L. Sankarasubramanian. (1995). Volatility structures of forward rates and the dynamics of the term structure. Mathematical Finance. 5, 55-72.
19.Yan, H. (2001). Dynamic models of the term structure. Financial Analysts Journal. 60-76.
此全文未授權公開