Global ETD Search

161	Warrantvärdering : En jämförelse mellan Monte-Carlo och Black-Scholes Ryhed, Erik, Thornadsson, Per, Holm, Gunnar January 2006 (has links) Syftet med denna uppsats är att med tre GARCH-modeller skatta volatiliteten för fjorton aktier med t- och normalfördelade slumptermer. Dessa volatiliteter implementeras sedan i Black-Scholes modell samt i Monte-Carlo simuleringar och utfallen av dessa två värderingsmetoder jämförs. Författarna har kommit fram till att GARCH-modeller behövs för att skatta volatiliteten för de aktier som ingår i arbetet då modellerna tar hänsyn till den föreliggande heteroskedasticiteten. De skillnader som uppstår mellan Monte-Carlo simuleringar och Black-Scholes modell beror främst på skillnader mellan normal- och t-fördelningen samt att volatiliteten ger större effekt i Monte-Carlo simuleringarna. Författarna kan inte uttala sig om huruvida Monte-Carlo skattningarna ger bättre resultat än den vedertagna Black-Scholes modell, däremot är Monte-Carlo mer teoretiskt korrekt. ARCH GARCH aktievärdering volatilitet t-fördelning normalfördelning heterskedasticitet varians statistik finansiering finansiell ekonomi E-GARCH TARCH ARMA Monte-Carlo Black-Scholes warrant option aktie Business studies Företagsekonomi
162	Extending and simulating the quantum binomial options pricing model Meyer, Keith 23 April 2009 (has links) Pricing options quickly and accurately is a well known problem in finance. Quantum computing is being researched with the hope that quantum computers will be able to price options more efficiently than classical computers. This research extends the quantum binomial option pricing model proposed by Zeqian Chen to European put options and to Barrier options and develops a quantum algorithm to price them. This research produced three key results. First, when Maxwell-Boltzmann statistics are assumed, the quantum binomial model option prices are equivalent to the classical binomial model. Second, options can be priced efficiently on a quantum computer after the circuit has been built. The time complexity is O((N − τ)log(N − τ)) and it is in the BQP quantum computational complexity class. Finally, challenges extending the quantum binomial model to American, Asian and Bermudan options exist as the quantum binomial model does not take early exercise into account. / May 2009 Quantum Options Binomial No-arbitrage Risk-neutral Computing Stock Black-Scholes Cox-Ross-Rubinstein Pricing Model European American Bermudan Barrier Volatility
163	緩長記憶效應下的選擇權評價彭貴田 Unknown Date (has links) 傳統效率市場假設股價的波動是隨機的，亦即股價是無法預測。近來的文獻指出股價的波動是不完全是隨機的，且股價的波動具有緩長記憶(long memory)的特性。在本文中我們以R/S分析發現臺灣股市的Hurst指數為0.68，即具有趨勢持續性(trend persistent)之效果，根據此依特性，我們根據Necula(2002)的研究，來評價台股選擇權，發現此新評價模式產生之價格較接近市場價格。緩長記憶碎形布朗運動 Hurst 指數 R/S分析碎形Black-Scholes選擇權評價
164	Extending and simulating the quantum binomial options pricing model Meyer, Keith 23 April 2009 (has links) http://orcid.org/0000-0002-1641-5388 / Pricing options quickly and accurately is a well known problem in finance. Quantum computing is being researched with the hope that quantum computers will be able to price options more efficiently than classical computers. This research extends the quantum binomial option pricing model proposed by Zeqian Chen to European put options and to Barrier options and develops a quantum algorithm to price them. This research produced three key results. First, when Maxwell-Boltzmann statistics are assumed, the quantum binomial model option prices are equivalent to the classical binomial model. Second, options can be priced efficiently on a quantum computer after the circuit has been built. The time complexity is O((N − τ)log(N − τ)) and it is in the BQP quantum computational complexity class. Finally, challenges extending the quantum binomial model to American, Asian and Bermudan options exist as the quantum binomial model does not take early exercise into account. / May 2009 Quantum Options Binomial No-arbitrage Risk-neutral Computing Stock Black-Scholes Cox-Ross-Rubinstein Pricing Model European American Bermudan Barrier Volatility
165	Stochastic Volatility Models for Contingent Claim Pricing and Hedging. Manzini, Muzi Charles. January 2008 (has links) <p>The present mini-thesis seeks to explore and investigate the mathematical theory and concepts that underpins the valuation of derivative securities, particularly European plainvanilla options. The main argument that we emphasise is that novel models of option pricing, as is suggested by Hull and White (1987) [1] and others, must account for the discrepancy observed on the implied volatility &ldquo / smile&rdquo / curve. To achieve this we also propose that market volatility be modeled as random or stochastic as opposed to certain standard option pricing models such as Black-Scholes, in which volatility is assumed to be constant.</p> Contingent Claim Hedging Brownian Motion Black-Scholes Implied Volatility Stochastic Volatility Call Option Mixture Risk-Neutral Pricing Equity-linked Pension Brennan-Schwartz.
166	Numerical singular perturbation approaches based on spline approximation methods for solving problems in computational finance Khabir, Mohmed Hassan Mohmed January 2011 (has links) Options are a special type of derivative securities because their values are derived from the value of some underlying security. Most options can be grouped into either of the two categories: European options which can be exercised only on the expiration date, and American options which can be exercised on or before the expiration date. American options are much harder to deal with than European ones. The reason being the optimal exercise policy of these options which led to free boundary problems. Ever since the seminal work of Black and Scholes [J. Pol. Econ. 81(3) (1973), 637-659], the differential equation approach in pricing options has attracted many researchers. Recently, numerical singular perturbation techniques have been used extensively for solving many differential equation models of sciences and engineering. In this thesis, we explore some of those methods which are based on spline approximations to solve the option pricing problems. We show a systematic construction and analysis of these methods to solve some European option problems and then extend the approach to solve problems of pricing American options as well as some exotic options. Proposed methods are analyzed for stability and convergence. Thorough numerical results are presented and compared with those seen in the literature. Computational Finance Options Pricing Black-Scholes Equation Standard Options Nonstandard Options Free Boundary Problems Spline Approximation Theory Singular Perturbation Techniques Numerical Methods Convergence Analysis.
167	Stable Parameter Identification Evaluation of Volatility Rückert, Nadja, Anderssen, Robert S., Hofmann, Bernd 29 March 2012 (has links) (PDF) Using the dual Black-Scholes partial differential equation, Dupire derived an explicit formula, involving the ratio of partial derivatives of the evolving fair value of a European call option (ECO), for recovering information about its variable volatility. Because the prices, as a function of maturity and strike, are only available as discrete noisy observations, the evaluation of Dupire’s formula reduces to being an ill-posed numerical differentiation problem, complicated by the need to take the ratio of derivatives. In order to illustrate the nature of ill-posedness, a simple finite difference scheme is first used to approximate the partial derivatives. A new method is then proposed which reformulates the determination of the volatility, from the partial differential equation defining the fair value of the ECO, as a parameter identification activity. By using the weak formulation of this equation, the problem is localized to a subregion on which the volatility surface can be approximated by a constant or a constant multiplied by some known shape function which models the local shape of the volatility function. The essential regularization is achieved through the localization, the choice of the analytic weight function, and the application of integration-by-parts to the weak formulation to transfer the differentiation of the discrete data to the differentiation of the analytic weight function. Parameteridentifikation Volatilitätsfunktion Dupire Formel Finite Differenzen Parameter identification Volatility surfaces Dupire’s equation Finite difference Localization approach ddc:510 Volatilität Parameteridentifikation Black-Scholes-Modell
168	Valuation of credit default swaptions using Finite Difference Method / by Karabo Mirriam Motshabi. Motshabi, Karabo Mirriam January 2012 (has links) Credit default swaptions (CDS options) are credit derivatives that are widely used by ﬁnan-cial institutions such as banks and hedging companies to manage their credit risk. These options are usually priced using Black-Scholes model, but the assumptions underlying this model do not always hold especially when solving complex ﬁnancial problems. The proposed solution is to use numerical methods such as ﬁnite diﬀerence method (FDM) to approximate the solution of the Black-Scholes PDE in cases where closed form solutions cannot be obtained. The pricing of swaptions are important in ﬁnancial markets, hence we speciﬁcally discuss the pricing of interest rate swaptions, CDS options, commodity swaptions and energy swap-tions using Black-Scholes model. Simple parabolic PDE known as heat equation given at (Higham, 2004) forms a foundations to understand the application of FDM when solving a PDE. Since, Black-Scholes PDE is also a parabolic equation it is transformed to a form of a heat equation (diﬀusion equation) by applying change of variables technique. FDM, speciﬁcally Crank-Nicolson method can be applied to the heat equation but in this dissertation it is applied directly to the Black-Scholes PDE to approximate its solution. Therefore, it is preferable to use Crank-Nicolson method because it is known to be second- order accurate, unconditionally stable, very ﬂexible, suitable and can accommodate varia- tions in ﬁnancial problems, (Duﬀy, 2008). The stability of this method is investigated using a matrix approach because it accommodates the eﬀect of boundary conditions. To test the convergence of Crank-Nicolson method, it is compared with the Black-Scholes method used in (Tucker and Wei, 2005) to price CDS options. Conclusively the results obtained by Crank-Nicolson method to price CDS options are similar to those obtained using Black-Scholes method. / Thesis (MSc (Risk Analysis))--North-West University, Potchefstroom Campus, 2013. Finite dirrerence methods Black-Scholes method Credit default swap spreads credit default swaps and swaptions interest rate swaps and swaptions currency swaps and swaptions
169	Valuation of credit default swaptions using Finite Difference Method / by Karabo Mirriam Motshabi. Motshabi, Karabo Mirriam January 2012 (has links) Credit default swaptions (CDS options) are credit derivatives that are widely used by ﬁnan-cial institutions such as banks and hedging companies to manage their credit risk. These options are usually priced using Black-Scholes model, but the assumptions underlying this model do not always hold especially when solving complex ﬁnancial problems. The proposed solution is to use numerical methods such as ﬁnite diﬀerence method (FDM) to approximate the solution of the Black-Scholes PDE in cases where closed form solutions cannot be obtained. The pricing of swaptions are important in ﬁnancial markets, hence we speciﬁcally discuss the pricing of interest rate swaptions, CDS options, commodity swaptions and energy swap-tions using Black-Scholes model. Simple parabolic PDE known as heat equation given at (Higham, 2004) forms a foundations to understand the application of FDM when solving a PDE. Since, Black-Scholes PDE is also a parabolic equation it is transformed to a form of a heat equation (diﬀusion equation) by applying change of variables technique. FDM, speciﬁcally Crank-Nicolson method can be applied to the heat equation but in this dissertation it is applied directly to the Black-Scholes PDE to approximate its solution. Therefore, it is preferable to use Crank-Nicolson method because it is known to be second- order accurate, unconditionally stable, very ﬂexible, suitable and can accommodate varia- tions in ﬁnancial problems, (Duﬀy, 2008). The stability of this method is investigated using a matrix approach because it accommodates the eﬀect of boundary conditions. To test the convergence of Crank-Nicolson method, it is compared with the Black-Scholes method used in (Tucker and Wei, 2005) to price CDS options. Conclusively the results obtained by Crank-Nicolson method to price CDS options are similar to those obtained using Black-Scholes method. / Thesis (MSc (Risk Analysis))--North-West University, Potchefstroom Campus, 2013. Finite dirrerence methods Black-Scholes method Credit default swap spreads credit default swaps and swaptions interest rate swaps and swaptions currency swaps and swaptions
170	Extending and simulating the quantum binomial options pricing model Meyer, Keith 23 April 2009 (has links) Pricing options quickly and accurately is a well known problem in finance. Quantum computing is being researched with the hope that quantum computers will be able to price options more efficiently than classical computers. This research extends the quantum binomial option pricing model proposed by Zeqian Chen to European put options and to Barrier options and develops a quantum algorithm to price them. This research produced three key results. First, when Maxwell-Boltzmann statistics are assumed, the quantum binomial model option prices are equivalent to the classical binomial model. Second, options can be priced efficiently on a quantum computer after the circuit has been built. The time complexity is O((N − τ)log(N − τ)) and it is in the BQP quantum computational complexity class. Finally, challenges extending the quantum binomial model to American, Asian and Bermudan options exist as the quantum binomial model does not take early exercise into account. Quantum Options Binomial No-arbitrage Risk-neutral Computing Stock Black-Scholes Cox-Ross-Rubinstein Pricing Model European American Bermudan Barrier Volatility

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