Please use this identifier to cite or link to this item: https://ah.lib.nccu.edu.tw/handle/140.119/127917
題名: Lévy與GARCH-Lévy過程之選擇權評價與實證分析:台灣加權股價指數選擇權為例
Option Pricing under Levy Processes and GARCH-Levy Processes: An Empirical Analysis on TAIEX Index Options
作者: 林士貴
Lin, Shih-Kuei
吳仰哲
Lin, S. K.
Wu, Yang-Che
 廖四郎
Liao, Szu-Lang
貢獻者: 金融系
關鍵詞: 選擇權評價模型  ;  Lévy過程 ;  GARCH  ;  Variance Gamma過程  ;  Normal Inverse Gaussian過程   
Option Pricing Model ;  Lévy Process  ;  GARCH Process ;  Variance Gamma  ;  Normal Inverse Gaussian process
日期: Jan-2010
上傳時間: 19-Dec-2019
摘要: 根據過去實證指出,股價對數報酬率分配呈現高峰、偏態、厚尾及波動叢聚,而傳統 Black-Scholes 模型的缺點是無法捕捉這些現象。Lévy 過程之優點為能解決厚尾、高峰及偏態等 問題,而 GARCH-type 優點為能捕捉波動叢聚現象,本文結合兩者的優點提出 GARCH-Lévy 過 程以捕捉負偏態、高峰、厚尾及波動叢聚等報酬分配特徵,並且以蒙地卡羅法估算歐式買權的\n報價 ; 更進一步綜合文獻常採用選擇權評價模型,以台灣發行量加權股價指數與指數選擇權作 為研究對象,分別對 GARCH-Lévy 過程、布朗運動、Merton 跳躍擴散過程、GARCH-Normal 過程和 Lévy 過程等作實證分析比較,結果顯示 GARCH-Lévy 過程在樣本內對台股指數有較佳 的配適,但是在樣本外,variance gamma 選擇權評價模型對價平時的台指選擇權有最小評價誤 差,價內外則是 NGARCH-Normal 選擇權評價模型的評價誤差最小。
The distribution of stock log-returns shows empirically some stylized facts, such as excess kurtosis, skewness, heavy tails and volatility clustering. The assumptions of traditional Black-Scholes model fail to capture the above phenomena well. Lévy processes can deal with the former three phenomena and GARCH type models can handle the final phenomena. In this research, we propose GARCH-Lévy processes combining both Lévy processes and GARCH processes, and then price European call option in risk-neutral world via Monte Carlo simulations. The empirical results show that the GARCH-Lévy processes fit well in samples. For out-of-sample performance, however, variance gamma option pricing model is the best at the money, but NGARCH-Normal option pricing model is best in the money or out of the money.
關聯: 管理與系統(Journal of Management & System), Vol.17, No.1, pp.49-74
資料類型: article
Appears in Collections:期刊論文

Files in This Item:
File Description SizeFormat
60.pdf1.67 MBAdobe PDF2View/Open
Show full item record

Google ScholarTM

Check


Items in DSpace are protected by copyright, with all rights reserved, unless otherwise indicated.