Advanced Numerical Techniques (MT5213) – Muhammad Ali Jinnah University

[vc_row el_class=”inner-body-content” css=”.vc_custom_1666781987531{padding-top: 30px !important;padding-bottom: 20px !important;}”][vc_column][vc_custom_heading text=”Pre-requisite(s)” font_container=”tag:h3|font_size:20px|text_align:left” use_theme_fonts=”yes” css=”.vc_custom_1666781975682{margin-top: 0px !important;}”][vc_column_text]None[/vc_column_text][vc_custom_heading text=”Recommended Book(s)” font_container=”tag:h3|font_size:20px|text_align:left” use_theme_fonts=”yes”][vc_column_text]Computational Methods In Engineering Boundary Value Problems By T. Y. Na , (1979) Edition[/vc_column_text][vc_custom_heading text=”Reference Book(s)” font_container=”tag:h3|font_size:20px|text_align:left” use_theme_fonts=”yes”][vc_column_text]Numerical Analysis by Richard L. Burden and J. Douglas Faires , 9th Edition Edition

Analysis of Numerical Methods by H. B. Keller and Eugene Issacson , 2nd Edition Edition[/vc_column_text][vc_custom_heading text=”COURSE OBJECTIVES” use_theme_fonts=”yes”][vc_column_text]This course has been designed to enable the students to learn and apply some classical numerical techniques to solve boundary value problems. For linear problems, the main focus will be on the method of superposition, method of chasing and method of adjoint operator whereas for the nonlinear equations, shooting methods will be discussed. Students are expected to apply these techniques in the research work involving boundary value problems.[/vc_column_text][vc_custom_heading text=”COURSE LEARNING OUTCOMES (CLO)” use_theme_fonts=”yes”][vc_column_text]After studying this course the students should be able to:

learn some standard techniques of solving linear boundary value problems
learn the shooting method for finding the solution of nonlinear boundary value problems

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The idea of Taylor’s Theorem and its role in numerical analysis
Taylor’s method for the solution of initial value problems
Solution of second order linear boundary value problems by the method of superposition
Solution of third order linear boundary value problems by the method of superposition
Solution of the system of first order linear boundary value problems by the method of superposition
Method of chasing for the solution of second order linear boundary value problems
Method of chasing for solution of third order linear boundary value problems
Solution of the system of first order linear boundary value problems by the method of adjoint operator
Solution of second order linear boundary value problems by the method of adjoint operators
Shooting method involving Newton’s approach for the solution of nonlinear boundary value problems
Parallel Shooting method for the solution of nonlinear boundary value problems
Quasi Linearization of nonlinear boundary value problem

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