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1	Interest rate swaps : why do they exist and how should they be priced? Yu, Wing Tong Bosco January 2000 (has links) No description available. 332
2	Call Option Premium Dynamics Chen, Jim 12 1900 (has links) This study has a twofold purpose: to demonstrate the use of the Marquardt compromise method in estimating the unknown parameters contained in the probability call-option pricing models and to test empirically the following models: the Boness, the Black-Scholes, the Merton proportional dividend, the Ingersoll differential tax, and the Ingersoll proportional dividend and differential tax. probability call-option pricing models call-option contracts Options (Finance) Stocks -- Prices.
3	Avaliação de derivativos de taxas de juros : uma aplicação do Modelo CIR sobre opções de IDI Dalmagro, Lucas Bassani January 2015 (has links) Este trabalho tem por objetivo principal aplicar o modelo de precificação de opções de taxas de juros proposto por Barbachan e Ornelas (2003), com base nos modelos de taxa de juro e avaliação de opções de Cox, Ingerssol e Ross (1985), para avaliação de opções de compra sobre o Índice de Taxa Média de Depósitos Interfinanceiros de Um Dia (IDI), negociadas na BM&FBovespa. Para estimação dos parâmetros deste modelo, foi empregado o método de Máxima Verossimilhança. Neste contexto, também fez-se uso da fórmula de precificação de opções proposta por Black (1976), adaptada para o mercado de derivativos brasileiros, conforme implementação verificada no trabalho de Gluckstern et al. (2002). Tal aplicação torna-se interessante, pois este modelo é amplamente utilizado pelo mercado brasileiro para avaliação de opções sobre o IDI. De forma a verificar a aderência dos preços teóricos gerados pelos modelos, em comparação aos preços de mercado, métricas de erro foram empregadas. De forma geral, nossos resultados mostraram que ambos os modelos apresentam erros sistemáticos de precificação, onde o modelo CIR subavalia os prêmios das opções e o modelo de Black superprecifica. No entanto, bons resultados foram encontrados ao avaliarmos opções in-the-money e out-of-money com o modelo de Black. / This work aims to apply the interest rate option pricing model proposed by Barbachan and Ornelas (2003), based on the interest rate model and option pricing model developed by Cox, Ingersoll and Ross (1985), to evaluate call options on the 1 day Brazilian Interfinancial Deposits Index - IDI, traded at BM&FBovespa. The Maximum Likelihood method was applied to estimate the model parameters. In this context, the option pricing formula proposed by Black (1976), adapted for the Brazilian derivative Market, was also used, according implementation verified in Gluckstern et al. (2002). This application becomes interesting because this model is widely used by the Brazilian Market to evaluate options on IDI. In order to verify the adherence of theoretical prices generated by the models, in comparison to the Market prices, error metrics were applied. In general, our results pointed out that both models presented systematic pricing errors, in which the CIR model underestimates the option prices and Black’s model overestimates. However, good results were found on the evaluation of options in-the-money and out-of-money with the Black’s Model. Precificação Taxas de juros Interest rate options Interest rate option pricing models Interest rate models CIR model Black’s model Maximum likelihood Options on IDI
4	Avaliação de derivativos de taxas de juros : uma aplicação do Modelo CIR sobre opções de IDI Dalmagro, Lucas Bassani January 2015 (has links) Este trabalho tem por objetivo principal aplicar o modelo de precificação de opções de taxas de juros proposto por Barbachan e Ornelas (2003), com base nos modelos de taxa de juro e avaliação de opções de Cox, Ingerssol e Ross (1985), para avaliação de opções de compra sobre o Índice de Taxa Média de Depósitos Interfinanceiros de Um Dia (IDI), negociadas na BM&FBovespa. Para estimação dos parâmetros deste modelo, foi empregado o método de Máxima Verossimilhança. Neste contexto, também fez-se uso da fórmula de precificação de opções proposta por Black (1976), adaptada para o mercado de derivativos brasileiros, conforme implementação verificada no trabalho de Gluckstern et al. (2002). Tal aplicação torna-se interessante, pois este modelo é amplamente utilizado pelo mercado brasileiro para avaliação de opções sobre o IDI. De forma a verificar a aderência dos preços teóricos gerados pelos modelos, em comparação aos preços de mercado, métricas de erro foram empregadas. De forma geral, nossos resultados mostraram que ambos os modelos apresentam erros sistemáticos de precificação, onde o modelo CIR subavalia os prêmios das opções e o modelo de Black superprecifica. No entanto, bons resultados foram encontrados ao avaliarmos opções in-the-money e out-of-money com o modelo de Black. / This work aims to apply the interest rate option pricing model proposed by Barbachan and Ornelas (2003), based on the interest rate model and option pricing model developed by Cox, Ingersoll and Ross (1985), to evaluate call options on the 1 day Brazilian Interfinancial Deposits Index - IDI, traded at BM&FBovespa. The Maximum Likelihood method was applied to estimate the model parameters. In this context, the option pricing formula proposed by Black (1976), adapted for the Brazilian derivative Market, was also used, according implementation verified in Gluckstern et al. (2002). This application becomes interesting because this model is widely used by the Brazilian Market to evaluate options on IDI. In order to verify the adherence of theoretical prices generated by the models, in comparison to the Market prices, error metrics were applied. In general, our results pointed out that both models presented systematic pricing errors, in which the CIR model underestimates the option prices and Black’s model overestimates. However, good results were found on the evaluation of options in-the-money and out-of-money with the Black’s Model. Precificação Taxas de juros Interest rate options Interest rate option pricing models Interest rate models CIR model Black’s model Maximum likelihood Options on IDI
5	Avaliação de derivativos de taxas de juros : uma aplicação do Modelo CIR sobre opções de IDI Dalmagro, Lucas Bassani January 2015 (has links) Este trabalho tem por objetivo principal aplicar o modelo de precificação de opções de taxas de juros proposto por Barbachan e Ornelas (2003), com base nos modelos de taxa de juro e avaliação de opções de Cox, Ingerssol e Ross (1985), para avaliação de opções de compra sobre o Índice de Taxa Média de Depósitos Interfinanceiros de Um Dia (IDI), negociadas na BM&FBovespa. Para estimação dos parâmetros deste modelo, foi empregado o método de Máxima Verossimilhança. Neste contexto, também fez-se uso da fórmula de precificação de opções proposta por Black (1976), adaptada para o mercado de derivativos brasileiros, conforme implementação verificada no trabalho de Gluckstern et al. (2002). Tal aplicação torna-se interessante, pois este modelo é amplamente utilizado pelo mercado brasileiro para avaliação de opções sobre o IDI. De forma a verificar a aderência dos preços teóricos gerados pelos modelos, em comparação aos preços de mercado, métricas de erro foram empregadas. De forma geral, nossos resultados mostraram que ambos os modelos apresentam erros sistemáticos de precificação, onde o modelo CIR subavalia os prêmios das opções e o modelo de Black superprecifica. No entanto, bons resultados foram encontrados ao avaliarmos opções in-the-money e out-of-money com o modelo de Black. / This work aims to apply the interest rate option pricing model proposed by Barbachan and Ornelas (2003), based on the interest rate model and option pricing model developed by Cox, Ingersoll and Ross (1985), to evaluate call options on the 1 day Brazilian Interfinancial Deposits Index - IDI, traded at BM&FBovespa. The Maximum Likelihood method was applied to estimate the model parameters. In this context, the option pricing formula proposed by Black (1976), adapted for the Brazilian derivative Market, was also used, according implementation verified in Gluckstern et al. (2002). This application becomes interesting because this model is widely used by the Brazilian Market to evaluate options on IDI. In order to verify the adherence of theoretical prices generated by the models, in comparison to the Market prices, error metrics were applied. In general, our results pointed out that both models presented systematic pricing errors, in which the CIR model underestimates the option prices and Black’s model overestimates. However, good results were found on the evaluation of options in-the-money and out-of-money with the Black’s Model. Precificação Taxas de juros Interest rate options Interest rate option pricing models Interest rate models CIR model Black’s model Maximum likelihood Options on IDI
6	Accounting for employee share options : a critical analysis Sacho, Zwi Yosef 30 November 2003 (has links) The main goal of this dissertation was to obtain an understanding as to the true economic nature of employee share options and the problems surrounding the accounting thereof. The main conclusion of this study is that employee share options should be expensed in the income statement as and when the employee's services are performed. The reason is that employee share options are valuable financial instruments which the employer has used to compensate the employee for his services. It was also concluded that exercise date accounting and classification of outstanding employee share options as liabilities on the balance sheet is the most appropriate accounting treatment. Such accounting treatment trues up the accounting of employee share options with that of cash-settled share appreciation rights, which are economically equivalent transactions. The measurement of employee share options should be based on their fair value using an option-pricing model adapted for the specific features of employee share options. / Accounting / Thesis (M. Com. (Accounting Science)) Employee share options Option-pricing models Black-Scholes model Cox-Ross-Rubenstein binomial model Agency problem Moral hazard Equity-based compensation Vesting conditions Liabilities Financial instrument Employee stock options Accounting
7	Accounting for employee share options : a critical analysis Sacho, Zwi Yosef 30 November 2003 (has links) The main goal of this dissertation was to obtain an understanding as to the true economic nature of employee share options and the problems surrounding the accounting thereof. The main conclusion of this study is that employee share options should be expensed in the income statement as and when the employee's services are performed. The reason is that employee share options are valuable financial instruments which the employer has used to compensate the employee for his services. It was also concluded that exercise date accounting and classification of outstanding employee share options as liabilities on the balance sheet is the most appropriate accounting treatment. Such accounting treatment trues up the accounting of employee share options with that of cash-settled share appreciation rights, which are economically equivalent transactions. The measurement of employee share options should be based on their fair value using an option-pricing model adapted for the specific features of employee share options. / Accounting / Thesis (M. Com. (Accounting Science)) Employee share options Option-pricing models Black-Scholes model Cox-Ross-Rubenstein binomial model Agency problem Moral hazard Equity-based compensation Vesting conditions Liabilities Financial instrument Employee stock options Accounting
8	Analyse numérique de modèles de diffusion-sauts à volatilité stochastique : cas de l'évaluation des options / Numerical analysis of the stochastic volatility jump diffusion models : case of options pricing Jraifi, Abdelilah 03 February 2014 (has links) Dans le monde économique, les contrats d'options sont très utilisés car ils permettent de se couvrir contre les aléas et les risques dus aux fluctuations des prix des actifs sous-jacents. La détermination du prix de ces contrats est d'une grande importance pour les investisseurs.Dans cette thèse, on s'intéresse aux problèmes d'évaluation des options, en particulier les options Européennes et Quanto sur un actif financier dont le prix est modélisé en multi dimensions par un modèle de diffusion-saut à volatilité stochastique avec sauts (1er cas considère la volatilité sans sauts, dans le 2ème cas les sauts sont pris en compte, finalement dans le 3ème cas, l'actif sous-jacent est sans saut et la volatilité suit un CEV modèle sans saut). Ce modèle permet de mieux prendre en compte certains phénomènes observés dans les marchés. Nous développons des méthodes numériques qui déterminent les valeurs des prix de ces options. On présentera d'abord le modèle qui s'écrit sous la forme d'un système d'équations intégro-différentielles stochastiques "EIDS", et on étudiera l'existence et l'unicité de la solution de ce modèle en fonction de ses coefficients, puis on établira le lien entre le calcul du prix de l'option et la résolution de l'équation Intégro-différentielle partielle (EIDP). Ce lien, qui est basé sur la notion des générateurs infinitésimaux, nous permet d'utiliser différentes méthodes numériques pour l'évaluation des options considérées. Nous introduisons alors l'équation variationnelle associée aux EIDP et démontrons qu'elle admet une unique solution dans un espace de Sobolev avec poids en s'inspirant des travaux de Zhang [106].Nous nous concentrons ensuite sur l'approximation numérique du prix de l'option en considérant le problème dans un domaine borné, et nous utilisons pour la résolution numérique la méthode des éléments finis de type (P1), et un schéma d'Euler-Maruyama, pour se servir, d'une part de la méthode de différences finies en temps, et d'autre part de la méthode de Monté Carlo et la méthode Quasi Monte Carlo. Pour cette dernière méthode nous avons utilisé les suites de Halton afin d'améliorer la vitesse de convergence.Nous présenterons une étude comparative des différents résultats numériques obtenus dans plusieurs cas différents afin d'étudier la performance et l'efficacité des méthodes utilisées. / In the modern economic world, the options contracts are used because they allow to hedge against the vagaries and risks refers to fluctuations in the prices of the underlying assets. The determination of the price of these contracts is of great importance for investors.We are interested in problems of options pricing, actually the European and Quanto options on a financial asset. The price of that asset is modeled by a multi-dimentional jump diffusion with stochastic volatility. Otherwise, the first model considers the volatility as a continuous process and the second model considers it as a jump process. Finally in the 3rd model, the underlying asset is without jump and volatility follows a model CEV without jump. This model allow better to take into account some phenomena observed in the markets. We develop numerical methods that determine the values of prices for these options. We first write the model as an integro-differential stochastic equations system "EIDS", of which we study existence and unicity of solutions. Then we relate the resolution of PIDE to the computation of the option value. This link, which is based on the notion of infinitesimal generators, allows us to use different numerical methods. We therefore introduce the variational equation associated with the PIDE, and drawing on the work of Zhang [106], we show that it admits a unique solution in a weights Sobolev space We focus on the numerical approximation of the price of the option, by treating the problem in a bounded domain. We use the finite elements method of type (P1), and the scheme of Euler-Maruyama, for this serve, on the one hand the finite differences method in time, and on the other hand the method of Monte Carlo and the Quasi Monte Carlo method. For this last method we use of Halton sequences to improve the speed of convergence.We present a comparative study of the different numerical results in many different cases in order to investigate the performance and effectiveness of the used methods. Processus de Lévy Volatilité stochastique Formulation variationnelle Méthode des éléments finis Méthode de Monte Carlo Méthode de différences finies Évaluation des options. Lévy processes Stochastic volatility Variational formulation Finite element method Monte Carlo method Constant elasticity of variance model Finite difference methods Option pricing models.

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