COMPARISON ON STABILITY AND CONVERGENCE OF FINITE DIFFERENCE METHOD IN TRANSFORMING NON DIMENSIONAL EXPLICIT AND IMPLICIT PARABOLIC PAR TIAL DIFFERENTIAL EQUATION

dc.contributor.author	GIRMA MITIKU
dc.date.accessioned	2017-03-01T06:41:21Z
dc.date.available	2017-03-01T06:41:21Z
dc.date.issued	2009-02-13
dc.identifier.uri	http://hdl.handle.net/123456789/451
dc.description.abstract	In this thesis the convergence and stability criteria of the FDM in parabolic (heat) equation is examined with the Fourier and Neumann analysis and comparison is made for those methods, namely implicit, explicit and Crank Nicolson. Finally, the derived FDM from PDE is used and as a result its application turns to melting of ice which is a global problem.	en_US
dc.language.iso	en	en_US
dc.publisher	Arbaminch University	en_US
dc.subject	FDM, Stability, Convergence, Fourier analysis, Neumann analysis, Implicit, Explicit, Crank Nicolson Methods	en_US
dc.title	COMPARISON ON STABILITY AND CONVERGENCE OF FINITE DIFFERENCE METHOD IN TRANSFORMING NON DIMENSIONAL EXPLICIT AND IMPLICIT PARABOLIC PAR TIAL DIFFERENTIAL EQUATION	en_US
dc.type	Thesis	en_US