Importance sampling for Value-at-Risk computations under factor model

DC 欄位	值	語言
DC.contributor	統計研究所	zh_TW
DC.creator	呂駿杰	zh_TW
DC.creator	Chun-Chieh Lu	en_US
dc.date.accessioned	2016-6-29T07:39:07Z
dc.date.available	2016-6-29T07:39:07Z
dc.date.issued	2016
dc.identifier.uri	http://ir.lib.ncu.edu.tw:88/thesis/view_etd.asp?URN=103225013
dc.contributor.department	統計研究所	zh_TW
DC.description	國立中央大學	zh_TW
DC.description	National Central University	en_US
dc.description.abstract	風險價值(VaR)，它被定義為一個給定的時間範圍內利潤和損失分佈的條件分位數。雖然蒙地卡羅模擬是評估投資組合風險價值最有效的方法，這種方法主要的缺點在於需要大量的計算需求。所以在本文中，我們考慮在因子模型之下的重要性採樣。此外，我們對風險因子建模在多元常態分配和多元t分配。在此假設之下，引用upper bound 和optimal tilting 兩種方法來尋找新測度的最佳解。最後，比較重要性採樣和蒙地卡羅的相對效率。我們可以看出重要性採樣顯著地比蒙地卡羅來的更好。	zh_TW
dc.description.abstract	Value-at-Risk (VaR), which is defined as the conditional quantile of the profit-and-loss distribution for a given time horizon. Although the Monte Carlo simulation is the most powerful method to evaluate portfolio VaR, a major drawback of this method is that it is computationally demanding. So in this paper, we consider the efficient importance sampling method under factor model. Furthermore, we model the risk factors with multivariate normal distribution and multivariate t distribution. Among this assumptions, we introduce upper bound method and optimal tilting method to find the alternative measure Q. In the end, we give the relative efficiency of importance sampling method and Monte Carlo method. We show that the importance sampling method is significantly better than Monte Carlo method.	en_US
DC.subject	重要性採樣	zh_TW
DC.subject	因子模型	zh_TW
DC.subject	投資組合風險值	zh_TW
DC.subject	多元分布	zh_TW
DC.subject	Importance sampling	en_US
DC.subject	factor model	en_US
DC.subject	portfolio VaR	en_US
DC.subject	multivariate distribution	en_US
DC.title	Importance sampling for Value-at-Risk computations under factor model	en_US
dc.language.iso	en_US	en_US
DC.type	博碩士論文	zh_TW
DC.type	thesis	en_US
DC.publisher	National Central University	en_US

博碩士論文 103225013 完整後設資料紀錄