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1	SABR模型與SABR-LMM模型之實證分析 / Empirical Analysis of SABR Model and SABR-LMM Model 毛迦南, Mau,Cha-Nan Unknown Date (has links) 本篇論文驗證SABR模型與SABR-LMM模型的動態設定與市場選擇權價格下標的未來價格之隱含分配是否一致，判斷準則為SABR模型與SABR-LMM模型校準出的參數是否符合市場直覺。根據實證結果答案是肯定的，所以在SABR模型與SABR-LMM模型下評價選擇權不需要再做任何的主觀判斷或調整。此外本篇論文對於SABR模型與SABR-LMM模型的參數校準方法做了詳細的分析，並且清楚的閳述SABR模型與SABR-LMM模型的模型直覺。波動度微笑 SABR模型 SABR-LMM模型 Volatility Smile SABR Model SABR-LMM Model
2	臺指選擇權之SABR模型應用與中國結構型商品評價與分析-以股權連結商品為例 / Analysis of The SABR Model and China Structured Notes 康皓翔, Kang, Hao Hsiang Unknown Date (has links) 本篇論文分為兩個部份。第一部份驗證隨機波動度SABR 模型以臺灣證券交易所發行量加權股價指數選擇權為驗證產品所描繪出來的波動度微笑曲線，分析其特色與值得關注的地方。由於長期以來研究者所使用的Black模型評價選擇權公式無法衡量波動度風險；雖然局部波動度模型(Local Volatility Models)能描繪出波動度所形成的波動度微笑曲線(Volatility Smile)，其動態走勢卻與標的資產價格相反，兩模型皆與真實情形不符，唯以SABR模型能順利的解決以上問題。第二部份討論結構型商品。此部份以中國招商銀行發行的股權連結型商品作為範例，進行商品的拆解及評價，並分析其潛在風險，加以進行不同經濟情勢下的情境分析。評價個案為「掛勾香港地產股票人民幣理財計畫產品」，由於此商品連結標的達四個且有提前到期事件，並沒有封閉解。必須以風險中立下股價的動態過程模擬股價，使用蒙地卡羅模擬法來逼近合理價格。此外，亦針對評價結果進行避險參數及收益分析。臺指選擇權波動度微笑 SABR模型結構型商品蒙地卡羅模擬法 TXO Option Volatility Smile SABR Model Structure Notes Monte Carlo Simulation
3	波動度微笑之LM模型應用與結構型商品評價與分析-以匯率連動商品為例陳益利, Chen, Yi Li Unknown Date (has links) 本篇論文共分為兩部分，第一部份是以每年交易量非常大的外匯選擇權（FX Option）市場以及台指選擇權為例，以Brigo 及Mercurio這兩位學者於2000年提出的Lognormal Mixture model (簡稱LM model)為基礎，捕捉選擇權市場中典型的波動度微笑（Volatility smile）曲線之特性。第二部份係商品評價之應用，是以大陸地區發行的匯率連動結構型商品（Structure Notes）為主。第一部份中我們分別採用LM 模型（Lognormal Mixture Model）、Shifting LM模型（Shifting Lognormal Mixture Model）及LMDM模型（Lognormal Mixture with Different Mean Model）等三種模型，用以衡量其實際上在外匯選擇權市場及台指選擇權中波動微笑曲線校準的準確性。結果顯示LM模型、Shifting LM模型及LMDM模型均能有效地反應並捕捉出選擇權市場中波動度微笑曲線之特性，而其中又以LMDM模型的效果最佳，其無論在波動度校準或是選擇權價格評價上的誤差均最小。第二部分是以「中國銀行匯聚寶0709G掛鉤美元兌加元匯率之加元產品」的匯率連動結構型商品為例，以Garman and Kohlhagen（1983）外匯選擇權模型求出其封閉解並作發行商期初利潤分析，然後再用蒙地卡羅模擬法進行投資人期末報酬分析。此外，亦針對此種商品的敏感性與避險參數作分析。外匯選擇權波動度微笑 Lognormal Mixture模型 Shifting LM模型 LMDM模型結構型商品 FX Option Volatility Smile Lognormal Mixture Model Shifting LM Model LMDM Model Structure Notes
4	位移與混合型離散過程對波動度模型之解析與實證 / Displaced and Mixture Diffusions for Analytically-Tractable Smile Models 林豪勵, Lin, Hao Li Unknown Date (has links) Brigo與Mercurio提出了三種新的資產價格過程，分別是位移CEV過程、位移對數常態過程與混合對數常態過程。在這三種過程中，資產價格的波動度不再是一個固定的常數，而是時間與資產價格的明確函數。而由這三種過程所推導出來的歐式選擇權評價公式，將會導致隱含波動度曲線呈現傾斜曲線或是微笑曲線，且提供了參數讓我們能夠配適市場的波動度結構。本文利用台指買權來實證Brigo與Mercurio所提出的三種歐式選擇權評價公式，我們發現校準結果以混合對數常態過程優於位移CEV過程，而位移CEV過程則稍優於位移對數常態過程。因此，在實務校準時，我們建議以混合對數常態過程為台指買權的評價模型，以達到較佳的校準結果。 / Brigo and Mercurio proposed three types of asset-price dynamics which are shifted-CEV process, shifted-lognormal process and mixture-of-lognormals process respectively. In these three processes, the volatility of the asset price is no more a constant but a deterministic function of time and asset price. The European option pricing formulas derived from these three processes lead respectively to skew and smile in the term structure of implied volatilities. Also, the pricing formula provides several parameters for fitting the market volatility term structure. The thesis applies Taiwan’s call option to verifying these three pricing formulas proposed by Brigo and Mercurio. We find that the calibration result of mixture-of-lognormals process is better than the result of shifted-CEV process and the calibration result of shifted-CEV process is a little better than the result of shifted-lognormal process. Therefore, we recommend applying the pricing formula derived from mixture-of-lognormals process to getting a better calibration. 資產價格的動態過程風險中立機率測度選擇權評價公式波動度傾斜波動度微笑非線性規劃參數校準 asset-price dynamics risk-neutral density option pricing formula volatility skew volatility smile nonlinear programming calibration of parameters
5	狀態轉換跳躍相關模型下選擇權定價:股價指數選擇權之實證 / Option pricing under regime-switching jump model with dependent jump sizes: evidence from stock index option 李家慶, Lee, Jia-Ching Unknown Date (has links) Black and Scholes (1973)對於報酬率提出以B-S模型配適，但B-S模型無法有效解釋報酬率不對稱高狹峰、波動度微笑、波動度叢聚、長記憶性的性質。Merton (1976)認為不尋常的訊息來臨會影響股價不連續跳躍，因此發展B-S模型加入不連續跳躍風險項的跳躍擴散模型，該模型可同時描述報酬率不對稱高狹峰和波動度微笑兩性質。Charles, Fuh and Lin (2011)加以考慮市場狀態提出狀態轉換跳躍模型，除了保留跳躍擴散模型可描述報酬率不對稱高狹峰和波動度微笑，更可以敘述報酬率的波動度叢聚和長記憶性。本文進一步拓展狀態轉換跳躍模型，考慮不連續跳躍風險項的帄均數與市場狀態相關，提出狀態轉換跳躍相關模型。並以道瓊工業指數與S&P 500指數1999年至2010年股價指數資料，採用EM和SEM分別估計參數與估計參數共變異數矩陣。使用概似比檢定結果顯示狀態轉換跳躍相關模型比狀態轉換跳躍獨立模型更適合描述股價指數報酬率。並驗證狀態轉換跳躍相關模型也可同時描述報酬率不對稱高狹峰、波動度微笑、波動度叢聚、長記憶性。最後利用Esscher轉換法計算股價指數選擇權定價公式，以敏感度分析模型參數對於定價結果的影響，並且市場驗證顯示狀態轉換跳躍相關模型會有最小的定價誤差。 / Black and Scholes (1973) proposed B-S model to fit asset return, but B-S model can’t effectively explain some asset return properties, such as leptokurtic, volatility smile, volatility clustering and long memory. Merton (1976) develop jump diffusion model (JDM) that consider abnormal information of market will affect the stock price, and this model can explain leptokurtic and volatility smile of asset return at the same time. Charles, Fuh and Lin (2011) extended the JDM and proposed regime-switching jump independent model (RSJIM) that consider jump rate is related to market states. RSJIM not only retains JDM properties but describes volatility clustering and long memory. In this paper, we extend RSJIM to regime-switching jump dependent model (RSJDM) which consider jump size and jump rate are both related to market states. We use EM and SEM algorithm to estimate parameters and covariance matrix, and use LR test to compare RSJIM and RSJDM. By using 1999 to 2010 Dow-Jones industrial average index and S&P 500 index as empirical evidence, RSJDM can explain index return properties said before. Finally, we calculate index option price formulation by Esscher transformation and do sensitivity analysis and market validation which give the smallest error of option prices by RSJDM. 股價指數選擇權狀態轉換跳躍相關模型波動聚集波動度微笑 EM演算法 Esscher轉換法 index option regime-switching jump dependent model volatility clustering volatility smile EM algorithm Esscher transformation
6	狀態轉換下利率與跳躍風險股票報酬之歐式選擇權評價與實證分析 / Option Pricing and Empirical Analysis for Interest Rate and Stock Index Return with Regime-Switching Model and Dependent Jump Risks 巫柏成, Wu, Po Cheng Unknown Date (has links) Chen, Chang, Wen and Lin (2013)提出馬可夫調控跳躍過程模型(MMJDM)描述股價指數報酬率，布朗運動項、跳躍項之頻率與市場狀態有關。然而，利率並非常數，本論文以狀態轉換模型配適零息債劵之動態過程，提出狀態轉換下的利率與具跳躍風險的股票報酬之二維模型(MMJDMSI)，並以1999年至2013年的道瓊工業指數與S&P 500指數和同期間之一年期美國國庫劵價格為實證資料，採用EM演算法取得參數估計值。經由概似比檢定結果顯示無論道瓊工業指數還是S&P 500指數，狀態轉換下利率與跳躍風險之股票報酬二維模型更適合描述報酬率。接著，利用Esscher轉換法推導出各模型下的股價指數之歐式買權定價公式，再對MMJDMSI模型進行敏感度分析以評估模型參數發生變動時對於定價公式的影響。最後，以實證資料對各模型進行模型校準及計算隱含波動度，結果顯示MMJDMSI在價內及價外時定價誤差為最小或次小，且此模型亦能呈現出波動度微笑曲線之現象。 / To model asset return, Chen, Chang, Wen and Lin (2013) proposed Markov-Modulated Jump Diffusion Model (MMJDM) assuming that the Brownian motion term and jump frequency are all related to market states. In fact, the interest rate is not constant, Regime-Switching Model is taken to fit the process of the zero-coupon bond price, and a bivariate model for interest rate and stock index return with regime-switching and dependent jump risks (MMJDMSI) is proposed. The empirical data are Dow Jones Industrial Average and S&P 500 Index from 1999 to 2013, together with US 1-Year Treasury Bond over the same period. Model parameters are estimated by the Expectation-Maximization (EM) algorithm. The likelihood ratio test (LRT) is performed to compare nested models, and MMJDMSI is better than the others. Then, European call option pricing formula under each model is derived via Esscher transformation, and sensitivity analysis is conducted to evaluate changes resulted from different parameter values under the MMJDMSI pricing formula. Finally, model calibrations are performed and implied volatilities are computed under each model empirically. In cases of in-the-money and out-the-money, MMJDMSI has either the smallest or the second smallest pricing error. Also, the implied volatilities from MMJDMSI display a volatility smile curve. EM演算法 Esscher轉換法歐式買權定價公式敏感度分析模型校準波動度微笑曲線 MMJDMSI model EM algorithm Esscher Transformation European call option pricing formula sensitivity analysis; model model calibration volatility smile curve
7	Empirical Performance and Asset Pricing in Markov Jump Diffusion Models / 馬可夫跳躍擴散模型的實證與資產定價林士貴, Lin, Shih-Kuei Unknown Date (has links) 為了改進Black-Scholes模式的實證現象，許多其他的模型被建議有leptokurtic特性以及波動度聚集的現象。然而對於其他的模型分析的處理依然是一個問題。在本論文中，我們建議使用馬可夫跳躍擴散過程，不僅能整合leptokurtic與波動度微笑特性，而且能產生波動度聚集的與長記憶的現象。然後，我們應用Lucas的一般均衡架構計算選擇權價格，提供均衡下當跳躍的大小服從一些特別的分配時則選擇權價格的解析解。特別地，考慮當跳躍的大小服從兩個情況，破產與lognormal分配。當馬可夫跳躍擴散模型的馬可夫鏈有兩個狀態時，稱為轉換跳躍擴散模型，當跳躍的大小服從lognormal分配我們得到選擇權公式。使用轉換跳躍擴散模型選擇權公式，我們給定一些參數下研究公式的數值極限分析以及敏感度分析。 / To improve the empirical performance of the Black-Scholes model, many alternative models have been proposed to address the leptokurtic feature of the asset return distribution, and the effects of volatility clustering phenomenon. However, analytical tractability remains a problem for most of the alternative models. In this dissertation, we propose a Markov jump diffusion model, that can not only incorporate both the leptokurtic feature and volatility smile, but also present the economic features of volatility clustering and long memory. Next, we apply Lucas's general equilibrium framework to evaluate option price, and to provide analytical solutions of the equilibrium price for European call options when the jump size follows some specific distributions. In particular, two cases are considered, the defaultable one and the lognormal distribution. When the underlying Markov chain of the Markov jump diffusion model has two states, the so-called switch jump diffusion model, we write an explicit analytic formula under the jump size has a lognormal distribution. Numerical approximations of the option prices as well as sensitivity analysis are also given. 均衡分析歐式選擇權拉氏倒轉變換長記憶馬可夫跳躍擴散模型馬可夫控制瓦松過程數值倒轉方法換跳躍擴散過程變波動聚集波動度微笑 Equilibrium analysis European call option Laplace inverse transform Leptokurtic Long memory Markov jump diffusion model Markov modulated Poisson process Numerical inversion method Switch jump diffusion model Volatility clustering Volatility smile

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