Please use this identifier to cite or link to this item: http://localhost:8080/xmlui/handle/123456789/2286
Title: NINTH ORDER BLOCK HYBRID INTEGRATORS FOR DIRECT NUMERICAL SOLUTION OF SECOND ORDER DIFFERENTIAL EQUATIONS
Other Titles: Journal of the Nigerian Association of Mathematical Physics
Authors: JOSEPH, Folake
Keywords: Second order Initial-Boindary value problems
Block methods,
Initial and boundary Value Problem,
Issue Date: Dec-2020
Publisher: Journal of the Nigerian Association of Mathematical Physics
Series/Report no.: Vol 58;
Abstract: A ninth order numerical scheme is develped in this work to directly solve second order initial and boundary value problems and via the method of lines for the semi descritization and solution for second order partial differential equations. These schemes are developed via the collocation technique and unified to form a single block of hybrid integrators. The derived method is investigated for its consistency, zero-stability and convergence and found to satisfy these characteristics. Numerical examples shows that the derived method is fond to be efficient in terms of implimentation and less computer time and in terms of accuracy when compared to existing methods in literature.
URI: http://localhost:8080/xmlui/handle/123456789/2286
Appears in Collections:Research Articles

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