ADVANCED NUMERICAL METHOD-I (Optional Paper)
Classification of partial differential equations, Elliptic equation, Parabolic equation, Hyperbolic equation, Solution procedures-Finite differerences, Finite elements, Spectral expansion.
Finite Difference procedure in one dimension-Tri-diagonal algorithm, Measurement of numerical error, Loss of significance - Pivoting ,Equations with non-constant coefficients, Gradient boundary conditions, First order approximation, Second order approximation, Fictitious nodes,Richardson extrapolation.
Elliptic equations in two dimensions- Iterative methods- A general representation of a sparse matrix, The algorithms, Comparison of Gauss-Jacobi and Gauss-Seidel
Diagonal dominance, Non-rectangular domains.
Parabolic equations in One Dimension- Richardson's method, Bender-Schmidt method,Dufort-Frankel method, Crank-Nicolson method Numerical consistency, Numerical stability Fourier method , Matrix method , Gradient boundary conditions, Numerical convergence - The Lax equivalence theorem.
Parabolic equations in two dimensions- Alternating Direction Implicit,Consistency of ADI , Stability of the ADI algorithm, Hyperbolic equations in one space dimension-Characteristics , The CFL condition , Error analysis of the upwind scheme, Fourier analysis of the upwind scheme, The Lax Wendroff scheme .
- Fourier and Wavelet Analysis : G. Bachman, L. Narici and E. Beckenstein: Springer.
- Methods for PDEs and Frontiers in Numerical Analysis : J.E. Blawey, A.W. Craig : Springer.
- Theoretical Numerical Analysis : K. Atkinson, and W. Hay : Springer.
- Computational Methods for PDEs : M.K. Jain, S.R.K. Iyengar, R.K. Jain : Wiley Eastern.
- Numerical Methods Problems and solutions, Jain ; Iyengar.
- Numerical Methods for Engineers, Chapra,Steven C.
