Vector Analysis:
Transformation properties of vectors;
Differentiation and integration of vectors; Line integral, volume integral and surface
integral involving vector fields; Gradient, divergence and curl of a vector
field; Gauss' divergence theorem, Stokes' theorem, Green's theorem -
application to simple problems; Orthogonal curvilinear co-ordinate systems,
unit vectors in such systems, illustration by plane, spherical and cylindrical
co-ordinate systems only.
Matrices:Hermitian adjoint and inverse of a matrix; Hermitian, orthogonal, and unitary matrices; Eigenvalue and eigenvector (for both degenerate and non-degenerate cases); Similarity transformation; digitalization of real symmetric matrices.
Solution of second order linear differential equations with constant coefficients and variable coefficients by Frobenius’ method (singularity analysis not required); Solution of Legendre and Hermite equations about x=0; Legendre and Hermite polynomials - orthonormality properties.
Partial Differential Equations:
Solution by the method of separation of variables; Laplace's equation and its solution in Cartesian, spherical polar (axially symmetric problems), and cylindrical polar (`infinite cylinder' problems) coordinate systems.
Fourier Series:
Fourier expansion – statement of Dirichlet’s
condition, analysis of simple waveforms with Fourier series. Introduction to
Fourier transforms; the Dirac-delta function and its Fourier transform; other
simple examples. Vibration of stretched strings- plucked and struck cases.
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