Mesh Free Methods for Differential Models In Financial Mathematics

dc.contributor.authorSidahmed, Abdelmgid Osman Mohammed
dc.date.accessioned2026-06-18T09:36:25Z
dc.date.available2026-06-18T09:36:25Z
dc.date.issued2011
dc.description.abstractMany problems in financial world are being modeled by means of differential equation. These problems are time dependent, highly nonlinear, stochastic and heavily depend on the previous history of time. A variety of financial products exists in the market, such as forwards, futures, swaps and options. Our main focus in this thesis is to use the numerical analysis tools to solve some option pricing problems. Depending upon the inter-relationship of the financial derivatives, the dimension of the associated problem increases drastically and hence conventional methods (for example, the finite difference methods or finite element methods) for solving them do not provide satisfactory results. To resolve this issue, we use a special class of numerical methods, namely, the mesh free methods. These methods are often better suited to cope with changes in the geometry of the domain of interest than classical discretization techniques. In this thesis, we apply these methods to solve problems that price standard and non-standard options. We then extend the proposed approach to solve Heston's volatility model. The methods in each of these cases are analyzed for stability and thorough comparative numerical results are provided.
dc.identifier.urihttps://hdl.handle.net/10566/24540
dc.language.isoen
dc.publisherUniversity of the Western Cape
dc.subjectComputational Finance
dc.subjectOption Pricing
dc.subjectMesh Free Methods
dc.subjectRadial Basis Functions
dc.subjectEuropean and American put Options
dc.titleMesh Free Methods for Differential Models In Financial Mathematics
dc.typeThesis

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