Numerical solutions and simulation of elliptic partial differential equations.

Ibrahim, Zeno Vitalis

dc.creator	Ibrahim, Zeno Vitalis
dc.date	2019-08-19T09:00:28Z
dc.date	2019-08-19T09:00:28Z
dc.date	2016
dc.date.accessioned	2021-05-06T12:58:59Z
dc.date.available	2021-05-06T12:58:59Z
dc.identifier	Ibrahim, Z. V. (2016). Numerical solutions and simulation of elliptic partial differential equations. Dodoma: The University of Dodoma.
dc.identifier	http://hdl.handle.net/20.500.12661/879
dc.identifier.uri	http://hdl.handle.net/20.500.12661/879
dc.description	Dissertation (MSc Mathematics)
dc.description	This dissertation provides general review of Partial Differential Equations. The Finite Difference Method which uses Taylor’s Theorem for solving Partial Differential Equations and Solution of elliptic partial differential equations, it also introduces the concepts of convergence, consistency and stability of finite difference scheme, Finite Difference Method (FDM) involving direct method and Iterative method like Gauss Seidel or Gauss Seidel with Successive Over Relaxation are applied on specific chosen example then simulation of Two Dimensional Laplace’s Partial Differential Equations of each method is to be done by MATLAB. Finally analysis of the results based on the three methods is made to indicate which method performs better than others. With this dissertation those wishing to apply Partial Differential Equations especially elliptic will be interested to use Gauss Seidel with Successive over Relaxation method since analysis shows that this method gives better results when solving itteratively.
dc.publisher	The University of Dodoma
dc.subject	Elliptic partial differential equations
dc.subject	Numerical simulation
dc.subject	Partial differential equation
dc.subject	Simulation elliptic equations
dc.subject	Differential equations
dc.subject	Numerical solutions
dc.subject	Differential equations simulation
dc.subject	Finite difference method
dc.subject	FDM
dc.title	Numerical solutions and simulation of elliptic partial differential equations.
dc.type	Dissertation