Computational Methods of Partial Differential Equations
This course will enable the students to -
- Understand various numerical methods.
- Understand the finite difference schemes for the solution of partial differential equations along with analyzing them for consistency, stability and convergence.
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Course |
Learning outcomes (at course level) |
Learning and teaching strategies |
Assessment Strategies |
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Course Code |
Course Title |
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24MAT 423(B) |
Computational Methods of Partial Differential Equations (Theory)
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CO160: Apply the numerical methods for solving 2D and 3D elliptic equations. CO161: Analyze the consistency, stability, convergence of a given numerical scheme and evaluate numerical methods for heat conduction equation. CO162: Apply various iterative techniques for solving system of first order Hyperbolic equations. CO163: Explore the methods for the numerical solution of second order Hyperbolic equations. CO164: Explore the finite element method for second order elliptic BVPS. CO165: Contribute effectively in course- specific interaction
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Approach in teaching: Interactive Lectures, Discussion, Informative videos
Learning activities for the students: Self learning assignments, Effective questions, Topic presentation, Assigned tasks |
Quiz, Class Test, Individual projects, Open Book Test, Continuous Assessment, Semester End Examination
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Finite difference method on 2D and 3D elliptic equation on non-uniform mesh, Finite difference methods for 2D and 3D Poisson’s equations of second and fourth order approximations, Iterative methods for 2D and 3D elliptic equations, Solution of large system of algebraic equations corresponding to discrete problems and iterative methods (Jacobi, Gauss-Seidel and SOR), Numerical methods extended method 2D and 3D bi-harmonic problems.
Compatibility, Consistency and convergence of the difference method, Numerical methods for one dimensional heat conduction equation: Schmidth scheme, Laasonen scheme Cranck Nicholson Scheme, Alternating direction implicit (ADI) methods for 2D and 3D heat conduction equations, Stability analysis (Energy method , Matrix method and Von-Neumann method).
Conservation laws, Explicit and implicit methods for diffusion equations, Explicit and implicit difference scheme for first order hyperbolic equations and their stability analysis, System of equation for first order hyperbolic equation, Conservative form, Alternating direction implicit (ADI ) methods for 2D and 3D first order hyperbolic equation.
Methods of characteristic for evolution problem of hyperbolic type, Von-Neumann method for stability analysis, Explicit and implicit method for second order hyperbolic equation, Operator splitting methods for 2D and 3D wave equations and their stability analysis, Unconditional stability analysis for second order hyperbolic equations.
Finite element method for second order elliptic BVPS, Finite element equation, Variational problems, Triangular and rectangular finite elements, Standard examples of finite elements, Mixed finite element methods.
- J.C. Strickwerda, Finite Difference Schemes and Partial Differential Equations, SIAM Publications, 2004.
- C.F. Gerald and P.O. Wheatley, Applied Numerical Analysis, Addison-Wesley, 1998.
- M.K. Jain, S.R.K. Iyenger and R.K. Jain, Computational Methods for Partial Differential Equations, New Age Publications, 2015.
- M.K. Jain, Numerical Solution of Differential Equations: Finite difference and Finite Element Approach, New Age Publications, 2018.
SUGGESTED READING
- J.W. Thomas, Numerical Partial Differential Equation: Finite Difference Method, Springer and Verlag Berlin, 1998.
- J.W. Thomas, Numerical Partial Differential Equations: Conservation Laws and Elliptical Equations, Springer and Verlag Berlin, 1999.
- K.J. Bathe and E.L. Wilson, Numerical Methods in Finite Element Analysis, Prentice-Hall India 1987.
- D.V. Griffiths and I.M. Smith, Numerical Methods for Engineers, Chapman and Hall/CRC, 2019.
e- RESOURCES
- https://core.ac.uk/download/pdf/338149.pdf
- https://www.sgo.fi/~j/baylie/Introduction%20to%20Partial%20Differential%20Equations%20-%20A%20Computational%20Approach%20-%20A.%20Tveito,%20R.%20Winther.pdf
- https://nptel.ac.in/courses/111107111
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