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June 29th, 2016, 02:04 PM
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Gauhati University Syllabus Physics
Hello sir will you please give me syllabus for Physics from Gauhati University? How to get a Gauhati University Syllabus Physics? The Gauhati University is provides a Syllabus for three year course in Physics. The undergraduate Course of the Gauhati University is a three year Course. There are six university examinations during the course, the Semester-I, Semester-II, Semester-III, Semester-IV, Semester-V, and Semester-VI held each at the end of six months covering three calendar years. Here I’m attaching PDF of Gauhati University Syllabus Physics: Grand Total Marks =1700(Major) + 900(General) = 2600 Grand Total Credit =136(Major) + 72(General) = 208 Syllabus of Mathematical Physics: Unit I : Linear Vector Spaces and Matrices N–dimensional linear vector space, basis, scalar product, metric spaces. Orthonormal basis. Linear operators and their algebra, commutativity. Infinite dimensional space – Hilbert space. Matrix representation of operators, Unitary and Hermitian matrices. Diagonalisation of matrices, eigen values and eigen vectors. Unit II : Tensors Contravariant and covariant tensors. Outer product and contraction. Kronecker delta and Levi Civita tensor. Metric tensor and Christoffel symbols. Covariant derivatives. Tensor representation of Laplacian. Unit III : Differential and integral equations Hermite and Legendre polynomials. Gamma and beta functions. Hypergeometric equation (solution only). Dirac ! functions. Partial differential equations: One dimensional wave equation, one dimensional heat flow equation (finite and infinite rod). Laplace’s equation and its solution. Green’s function. Integral equations and their classifications: Fredholm and Volterra types. Method of substitution. Unit IV : Complex variables Analyticity, Cauchy integral theorem, residue theorem and complex integrations. Unit V : Integral transforms Laplace transform and inverse Laplace transform. Fourier transform. Shifting theorem and convolution. Solution of differential equations with the help of Laplace and Fourier transform. Unit VI : Group theory Introduction to groups, subgroups, coset, classes and factor groups. Homomorphism and isomorphism. Direct and semi-direct products. Group representation: reducible and irreducible representation. Symmetry group, Unitary group, Lie groups: SU (2), SU (3). Point groups and applications. Last edited by Neelurk; February 8th, 2020 at 09:04 AM. |