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1	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
2	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
3	Simetrias de Lie da equação de Burgers generalizada / Lie point symmetries of generalized Burgers¿ equation Soares, Júnior César Alves, 1986- 11 March 2011 (has links) Orientador: Igor Leite Freire / Dissertação (mestrado) - Universidade Estadual de Campinas, Instituto de Matemática, Estatística e Computação Científica / Made available in DSpace on 2018-08-19T07:51:21Z (GMT). No. of bitstreams: 1 Soares_JuniorCesarAlves_M.pdf: 448504 bytes, checksum: 3bdbb23b41bf8a05b373b9117cd9aa9b (MD5) Previous issue date: 2011 / Resumo: Neste trabalho, é estudada uma generalização da equação de Burgers do ponto de vista da teoria de simetrias de Lie / Abstract: In this work, a generalization of Burgers equation is studied from the point of view of Lie point symmetry theory / Mestrado / Matematica Aplicada / Mestre em Matemática Aplicada Burgers, Equação de Equação de calor Lie, Simetrias de Hopf-Cole, Transformação de Burgers' equation Heat equation Lie point symmetry Hopf-Cole transformation
4	A Lie symmetry analysis of the heat equation through modified one-parameter local point transformation Adams, Conny Molatlhegi 08 1900 (has links) Using a Lie symmetry group generator and a generalized form of Manale's formula for solving second order ordinary di erential equations, we determine new symmetries for the one and two dimensional heat equations, leading to new solutions. As an application, we test a formula resulting from this approach on thin plate heat conduction. / Applied Mathematics / M.Sc. (Applied Mathematics) Heat equation Partial differential equation Lie point symmetry Lie equivalence transformation Invariant solution 515.353 Heat equation Partial differential equations Lie algebras
5	A Lie symmetry analysis of the heat equation through modified one-parameter local point transformation Adams, Conny Molatlhegi 08 1900 (has links) Using a Lie symmetry group generator and a generalized form of Manale's formula for solving second order ordinary di erential equations, we determine new symmetries for the one and two dimensional heat equations, leading to new solutions. As an application, we test a formula resulting from this approach on thin plate heat conduction. / Applied Mathematics / M. Sc. (Applied Mathematics) Heat equation Partial differential equation Lie point symmetry Lie equivalence transformation Invariant solution 515.353 Heat equation Partial differential equations Lie algebras

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