Global ETD Search

11	Pricing barrier options with numerical methods / Candice Natasha de Ponte De Ponte, Candice Natasha January 2013 (has links) Barrier options are becoming more popular, mainly due to the reduced cost to hold a barrier option when compared to holding a standard call/put options, but exotic options are difficult to price since the payoff functions depend on the whole path of the underlying process, rather than on its value at a specific time instant. It is a path dependent option, which implies that the payoff depends on the path followed by the price of the underlying asset, meaning that barrier options prices are especially sensitive to volatility. For basic exchange traded options, analytical prices, based on the Black-Scholes formula, can be computed. These prices are influenced by supply and demand. There is not always an analytical solution for an exotic option. Hence it is advantageous to have methods that efficiently provide accurate numerical solutions. This study gives a literature overview and compares implementation of some available numerical methods applied to barrier options. The three numerical methods that will be adapted and compared for the pricing of barrier options are: • Binomial Tree Methods • Monte-Carlo Methods • Finite Difference Methods / Thesis (MSc (Applied Mathematics))--North-West University, Potchefstroom Campus, 2013 Barrier options Black-Scholes Binomial method Trinomial method Monte Carlo simulation Finite difference method
12	Pricing barrier options with numerical methods / Candice Natasha de Ponte De Ponte, Candice Natasha January 2013 (has links) Barrier options are becoming more popular, mainly due to the reduced cost to hold a barrier option when compared to holding a standard call/put options, but exotic options are difficult to price since the payoff functions depend on the whole path of the underlying process, rather than on its value at a specific time instant. It is a path dependent option, which implies that the payoff depends on the path followed by the price of the underlying asset, meaning that barrier options prices are especially sensitive to volatility. For basic exchange traded options, analytical prices, based on the Black-Scholes formula, can be computed. These prices are influenced by supply and demand. There is not always an analytical solution for an exotic option. Hence it is advantageous to have methods that efficiently provide accurate numerical solutions. This study gives a literature overview and compares implementation of some available numerical methods applied to barrier options. The three numerical methods that will be adapted and compared for the pricing of barrier options are: • Binomial Tree Methods • Monte-Carlo Methods • Finite Difference Methods / Thesis (MSc (Applied Mathematics))--North-West University, Potchefstroom Campus, 2013 Barrier options Black-Scholes Binomial method Trinomial method Monte Carlo simulation Finite difference method
13	Nové produkty na derivátovém trhu / New derivatives products Žvak, David January 2008 (has links) Derivatives market is one of the fastest growing parts of the financial market. It was reflected in a sharp increase in trading volumes over the last decade, growth in number of participants and the development of new products. These products, which were devoloped in 80's and 90's sometimes refer to "new derivatives products". The aim of this diploma thesis is analyze selected new derivatives products, concretely barrier options and electricity futures.
14	On the calibration of Lévy option pricing models / Izak Jacobus Henning Visagie Visagie, Izak Jacobus Henning January 2015 (has links) In this thesis we consider the calibration of models based on Lévy processes to option prices observed in some market. This means that we choose the parameters of the option pricing models such that the prices calculated using the models correspond as closely as possible to these option prices. We demonstrate the ability of relatively simple Lévy option pricing models to nearly perfectly replicate option prices observed in nancial markets. We speci cally consider calibrating option pricing models to barrier option prices and we demonstrate that the option prices obtained under one model can be very accurately replicated using another. Various types of calibration are considered in the thesis. We calibrate a wide range of Lévy option pricing models to option price data. We con- sider exponential Lévy models under which the log-return process of the stock is assumed to follow a Lévy process. We also consider linear Lévy models; under these models the stock price itself follows a Lévy process. Further, we consider time changed models. Under these models time does not pass at a constant rate, but follows some non-decreasing Lévy process. We model the passage of time using the lognormal, Pareto and gamma processes. In the context of time changed models we consider linear as well as exponential models. The normal inverse Gaussian (N IG) model plays an important role in the thesis. The numerical problems associated with the N IG distribution are explored and we propose ways of circumventing these problems. Parameter estimation for this distribution is discussed in detail. Changes of measure play a central role in option pricing. We discuss two well-known changes of measure; the Esscher transform and the mean correcting martingale measure. We also propose a generalisation of the latter and we consider the use of the resulting measure in the calculation of arbitrage free option prices under exponential Lévy models. / PhD (Risk Analysis), North-West University, Potchefstroom Campus, 2015 Calibration Option pricing Lévy processes Normal inverse Gaussian distribution Lognormal distribution Pareto distribution Barrier options
15	On the calibration of Lévy option pricing models / Izak Jacobus Henning Visagie Visagie, Izak Jacobus Henning January 2015 (has links) In this thesis we consider the calibration of models based on Lévy processes to option prices observed in some market. This means that we choose the parameters of the option pricing models such that the prices calculated using the models correspond as closely as possible to these option prices. We demonstrate the ability of relatively simple Lévy option pricing models to nearly perfectly replicate option prices observed in nancial markets. We speci cally consider calibrating option pricing models to barrier option prices and we demonstrate that the option prices obtained under one model can be very accurately replicated using another. Various types of calibration are considered in the thesis. We calibrate a wide range of Lévy option pricing models to option price data. We con- sider exponential Lévy models under which the log-return process of the stock is assumed to follow a Lévy process. We also consider linear Lévy models; under these models the stock price itself follows a Lévy process. Further, we consider time changed models. Under these models time does not pass at a constant rate, but follows some non-decreasing Lévy process. We model the passage of time using the lognormal, Pareto and gamma processes. In the context of time changed models we consider linear as well as exponential models. The normal inverse Gaussian (N IG) model plays an important role in the thesis. The numerical problems associated with the N IG distribution are explored and we propose ways of circumventing these problems. Parameter estimation for this distribution is discussed in detail. Changes of measure play a central role in option pricing. We discuss two well-known changes of measure; the Esscher transform and the mean correcting martingale measure. We also propose a generalisation of the latter and we consider the use of the resulting measure in the calculation of arbitrage free option prices under exponential Lévy models. / PhD (Risk Analysis), North-West University, Potchefstroom Campus, 2015 Calibration Option pricing Lévy processes Normal inverse Gaussian distribution Lognormal distribution Pareto distribution Barrier options
16	Exotické opcie (Digitály a bariery) / Exotic Options (Digitals and Barriers) Fečko, Michal January 2008 (has links) Main objective of this diploma thesis is to point out to the advantages related to the applications of Exotic options and show that we have to be aware of complexities which arise in hedging such products. There exists a quantity of different Exotic options products so the first chapter is dedicated to its basic classification, although not all instruments were included, as some are very specific. According to the application of options, we took out the most used Exotic options. The number one in the Exotic options world, are the Barrier options, followed by Digital options
17	Oceňování bariérových opcí / Barrier options pricing Macháček, Adam January 2013 (has links) In the presented thesis we study three methods of pricing European currency barrier options. With help of these methods we value selected barrier options with underlying asset EUR/CZK. In the first chapter we introduce the basic definitions from the world of financial derivatives and we describe our data. In the second chapter we deal with the classical model based on geometric Brownian motion of underlying asset and we prove a theorem of valuating Up-In-barrier option in this model. In the third chapter we introduce a model with stochastic volatility, the Heston model. We calibrate this model to market data and we use it to value our barrier options. In the last chapter we describe a jump diffusion model. Again we calibrate this jump diffusion model to market data and price our barrier options. The aim of this thesis is to decribe and to compare different methods of valuating barrier options. 1
18	On the pricing equations of some path-dependent options Eriksson, Jonatan January 2006 (has links) <p>This thesis consists of four papers and a summary. The common topic of the included papers are the pricing equations of path-dependent options. Various properties of barrier options and American options are studied, such as convexity of option prices, the size of the continuation region in American option pricing and pricing formulas for turbo warrants. In Paper I we study the effect of model misspecification on barrier option pricing. It turns out that, as in the case of ordinary European and American options, this is closely related to convexity properties of the option prices. We show that barrier option prices are convex under certain conditions on the contract function and on the relation between the risk-free rate of return and the dividend rate. In Paper II a new condition is given to ensure that the early exercise feature in American option pricing has a positive value. We give necessary and sufficient conditions for the American option price to coincide with the corresponding European option price in at least one diffusion model. In Paper III we study parabolic obstacle problems related to American option pricing and in particular the size of the non-coincidence set. The main result is that if the boundary of the set of points where the obstacle is a strict subsolution to the differential equation is C<sup>1</sup>-Dini in space and Lipschitz in time, there is a positive distance, which is uniform in space, between the boundary of this set and the boundary of the non-coincidence set. In Paper IV we derive explicit pricing formulas for turbo warrants under the classical Black-Scholes assumptions.</p> Mathematical analysis Parabolic partial differential equations variational inequalities American options barrier options monotonicity in the volatility turbo warrants pricing formulas Matematisk analys Mathematical analysis Analys
19	On the pricing equations of some path-dependent options Eriksson, Jonatan January 2006 (has links) This thesis consists of four papers and a summary. The common topic of the included papers are the pricing equations of path-dependent options. Various properties of barrier options and American options are studied, such as convexity of option prices, the size of the continuation region in American option pricing and pricing formulas for turbo warrants. In Paper I we study the effect of model misspecification on barrier option pricing. It turns out that, as in the case of ordinary European and American options, this is closely related to convexity properties of the option prices. We show that barrier option prices are convex under certain conditions on the contract function and on the relation between the risk-free rate of return and the dividend rate. In Paper II a new condition is given to ensure that the early exercise feature in American option pricing has a positive value. We give necessary and sufficient conditions for the American option price to coincide with the corresponding European option price in at least one diffusion model. In Paper III we study parabolic obstacle problems related to American option pricing and in particular the size of the non-coincidence set. The main result is that if the boundary of the set of points where the obstacle is a strict subsolution to the differential equation is C1-Dini in space and Lipschitz in time, there is a positive distance, which is uniform in space, between the boundary of this set and the boundary of the non-coincidence set. In Paper IV we derive explicit pricing formulas for turbo warrants under the classical Black-Scholes assumptions. Mathematical analysis Parabolic partial differential equations variational inequalities American options barrier options monotonicity in the volatility turbo warrants pricing formulas Matematisk analys Mathematical analysis Analys
20	Barjero pasirinkimo sandorių įkainojimo metodų tyrimas / The investigation of the barrier options pricing models Palivonaitė, Rita 11 August 2008 (has links) Darbe nagrinėjami barjero pasirinkimo sandorių įkainojimo metodai. Barjero pasirinkimo sandorių išmokos sutampa su įprastinių pasirinkimo sandorių išmokomis, jei išpildoma papildoma barjero sąlyga, kurią reikia įvertinti. Įkainojimui naudojami diskretieji modeliai: binominis ir trinominis, tiriama jų konvergavimas į klasikinę Black-Scholes formulę. Dėl modelio diskretumo ir barjero sąlygos konvergavimas tam tikrais atvejais yra lėtas ir nemonotoniškas. Todėl siūloma pritaikyti adaptyviojo tinklelio algoritmą, smulkinant trinominio medžio tinklelį kritinėse srityse. Šiame darbe pateikiami rezultatai, gauti palyginus barjero pasirinkimo sandorio įkainojimo modelius. / In this paper we consider barrier options pricing models. Barrier options are standard call or put options except that they disappear or appear if the asset price crosses a predeterminant set of fixing dates. Barrier options are priced using continuous state Black-Scholes model and numerical approximation techniques, such as binomial and trinomial. Because of the the barrier condition and discreteness of these models the convergence to Black-Scholes model sometimes is slow. It is offered to apply adaptive mesh model grafting small sections of fine high-resolution lattice onto a tree in trinomial model. In this work we present the comparison of the models with some numerical results for barrier options. Mathematics Barjero pasirinkimo sandoriai Black-Scholes formulė Binominis metodas Trinominis metodas Adaptyviojo tinklelio metodas Barrier options Black-Scholes model Binomial model Trinomial model Adaptive mesh model

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