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1	A Multidimensional Fitted Finite Volume Method for the Black-Scholes Equation Governing Option Pricing Hung, Chen-Hui 05 July 2004 (has links) In this paper we present a finite volume method for a two-dimensional Black-Scholes equation with stochastic volatility governing European option pricing. In this work, we first formulate the Black-Scholes equation with a tensor (or matrix) diffusion coefficient into a conversative form. We then present a finite volume method for the resulting equation, based on a fitting technique proposed for a one-dimensional Black-Scholes equation. We show that the method is monotone by proving that the system matrix of the discretized equation is an M-matrix. Numerical experiments, performed to demonstrate the usefulness of the method, will be presented. option pricing finite volume method stochastic volatility Black-Scholes equation
2	Operator Splitting Methods and Artificial Boundary Conditions for a nonlinear Black-Scholes equation Uhliarik, Marek January 2010 (has links) There are some nonlinear models for pricing financial derivatives which can improve the linear Black-Scholes model introduced by Black, Scholes and Merton. In these models volatility is not constant anymore, but depends on some extra variables. It can be, for example, transaction costs, a risk from a portfolio, preferences of a large trader, etc. In this thesis we focus on these models. In the first chapter we introduce some important theory of financial derivatives. The second chapter is devoted to the volatility models. We derive three models concerning transaction costs (RAPM, Leland's and Barles-Soner's model) and Frey's model which assumes a large (dominant) trader on the market. In the third and in the forth chapter we derive portfolio and make numerical experiments with a free boundary. We use the first order additive and the second order Strang splitting methods. We also use approximations of Barles-Soner's model using the identity function and introduce an approximation with the logarithm function of Barles-Soner's model. These models we finally compare with models where the volatility includes constant transaction costs. finacial Mathematics nonlinear Black-Scholes equation volatility models splitting methods MATHEMATICS MATEMATIK Numerical analysis Numerisk analys
3	Evaluation of a least-squares radial basis function approximation method for solving the Black-Scholes equation for option pricing Wang, Cong January 2012 (has links) Radial basis function (RBF) approximation, is a new extremely powerful tool that is promising for high-dimensional problems, such as those arising from pricing of basket options using the Black-Scholes partial differential equation. The main problem for RBF methods have been ill-conditioning as the RBF shape parameter becomes small, corresponding to flat RBFs. This thesis employs a recently developed method called the RBF-QR method to reduce computational cost by improving the conditioning, thereby allowing for the use of a wider range of shape parameter values. Numerical experiments for the one-dimensional case are presented and a MATLAB implementation is provided. In our thesis, the RBF-QR method performs better than the RBF-Direct method for small shape parameters. Using Chebyshev points, instead of a standard uniform distribution, can increase the accuracy through clustering of the nodes towards the boundary. The least squares formulation for RBF methods is preferable to the collocation approach because it can result in smaller errors for the same number of basis functions. RBF radial basis function ill-conditioning shape parameter Black-Scholes equation option pricing
4	On a Fitted Finite Volume Method for the Valuation of Options on Assets with Stochastic Volatilities Hung, Chen-hui 22 June 2010 (has links) In this dissertation we first formulate the Black-Scholes equation with a tensor (or matrix) diffusion coefficient into a conservative form and present a convergence analysis for the two-dimensional Black-Scholes equation arising in the Hull-White model for pricing European options with stochastic volatility. We formulate a non-conforming Petrov-Galerkin finite element method with each basis function of the trial space being determined by a set of two-point boundary value problems defined on element edges. We show that the bilinear form of the finite element method is coercive and continuous and establish an upper bound of order O(h) on the discretization error of method, where h denotes the mesh parameter of the discretization. We then present a finite volume method for the resulting equation, based on a fitting technique proposed for a one-dimensional Black-Scholes equation. We show that the method is monotone by proving that the system matrix of the discretized equation is an M-matrix. Numerical experiments, performed to demonstrate the usefulness of the method, will be presentd. stability and convergence finite volume method European option pricing stochastic volatility Black-Scholes equation
5	Analytic Approaches to the Pricing Black-Scholes Equations of Asian Options Yu, Wei-Hau 05 July 2012 (has links) Asian option is an option which payoff depends on the average underlying price over some some specific time period. Although there is no closed form solution of asian option, appropriate change of variable and Num¡¦eraire would reduce some terms of equation satisfies the Asian call price function. This thesis presents asian option¡¦s properties and process of reduction terms. Black-Scholes equation change of Numeraire risk neutral Asian option Markov property
6	A Lie symmetry analysis of the Black-scholes Merton finance model through modified local one-parameter transformations Masebe, Tshidiso Phanuel 09 1900 (has links) The thesis presents a new method of Symmetry Analysis of the Black-Scholes Merton Finance Model through modi ed Local one-parameter transformations. We determine the symmetries of both the one-dimensional and two-dimensional Black-Scholes equations through a method that involves the limit of in nitesimal ! as it approaches zero. The method is dealt with extensively in [23]. We further determine an invariant solution using one of the symmetries in each case. We determine the transformation of the Black-Scholes equation to heat equation through Lie equivalence transformations. Further applications where the method is successfully applied include working out symmetries of both a Gaussian type partial di erential equation and that of a di erential equation model of epidemiology of HIV and AIDS. We use the new method to determine the symmetries and calculate invariant solutions for operators providing them. / Mathematical Sciences / Applied Mathematics / D. Phil. (Applied Mathematics) Black-Scholes equation Partial differential equation Lie Point Symmetry Lie equivalence transformation Invariant solution 515.353 Differential equations, Partial Merton Model
7	A Lie symmetry analysis of the Black-scholes Merton finance model through modified local one-parameter transformations Masebe, Tshidiso Phanuel 09 1900 (has links) The thesis presents a new method of Symmetry Analysis of the Black-Scholes Merton Finance Model through modi ed Local one-parameter transformations. We determine the symmetries of both the one-dimensional and two-dimensional Black-Scholes equations through a method that involves the limit of in nitesimal ! as it approaches zero. The method is dealt with extensively in [23]. We further determine an invariant solution using one of the symmetries in each case. We determine the transformation of the Black-Scholes equation to heat equation through Lie equivalence transformations. Further applications where the method is successfully applied include working out symmetries of both a Gaussian type partial di erential equation and that of a di erential equation model of epidemiology of HIV and AIDS. We use the new method to determine the symmetries and calculate invariant solutions for operators providing them. / Mathematical Sciences / Applied Mathematics / D. Phil. (Applied Mathematics) Black-Scholes equation Partial differential equation Lie Point Symmetry Lie equivalence transformation Invariant solution 515.353 Differential equations, Partial Merton Model
8	A high order compact method for nonlinear Black-Scholes option pricing equations with transaction costs Dremkova, Ekaterina January 2009 (has links) <p>In this work we consider the nonlinear case of Black-Scholes equation and apply it to American options. Also, method of Liao and Khaliq of high order was applied to nonlinear Black-Scholes equation in case of American options. Here, we use this method oh fourth order in time and space to raise American option price accuracy.</p> Mathematics nonlinear Black-Scholes equation Barles-Soner volatility compact methods Numerical analysis Numerisk analys Applied mathematics Tillämpad matematik
9	A high order compact method for nonlinear Black-Scholes option pricing equations with transaction costs Dremkova, Ekaterina January 2009 (has links) In this work we consider the nonlinear case of Black-Scholes equation and apply it to American options. Also, method of Liao and Khaliq of high order was applied to nonlinear Black-Scholes equation in case of American options. Here, we use this method oh fourth order in time and space to raise American option price accuracy. Mathematics nonlinear Black-Scholes equation Barles-Soner volatility compact methods Numerical analysis Numerisk analys Applied mathematics Tillämpad matematik
10	A equação de Black-Scholes com ação impulsiva / The Black-Scholes equation with impulse action Bonotto, Everaldo de Mello 13 June 2008 (has links) Impulsos são perturbações abruptas que ocorrem em curto espaço de tempo e podem ser consideradas instantâneas. E os mercados financeiros estão sujeitos a choques bruscos como mudanças de governos, quebra de empresas, entre outros. Assim, é natural considerarmos a ação de tais eventos na precificação de ativos financeiros. Nosso objetivo neste trabalho é obtermos uma formulação para a equação diferencial parcial de Black-Scholes com ação impulsiva de modo que os impulsos representem estes choques. Utilizaremos a teoria de integração não-absoluta em espaço de funções para obtenção desta formulação / Impulses describe the evolution of systems where the continuous development of a process is interrupted by abrupt changes of state. Financial markets are subject to extreme events or shocks as government changes, companies colapse, etc. Thus it seems natural to consider the action of these events in the valuation of derivative securities. The aim of this work is to obtain a formulation for the Black-Scholes equation with impulse action where the impulses can represent these shocks. We use the non-absolute integration theory in functional spaces to obtain such formulation Equação de Black-Scholes Equação de Schrödinger Equações diferenciais impulsivas Henstock integral Impulses Impulsive differential equations Impulsos Integral de Henstock Schrödinger equation The Black-Scholes equation

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