Modules / Lectures
Module NameDownload


Sl.No Chapter Name MP4 Download
1Lecture 1 : Introduction IDownload
2Lecture 2 : Introduction IIDownload
3Lecture 3 : Normal subgroup, Coset, Conjugate groupDownload
4Lecture 4 : Factor group, Homomorphism, IsomorphismDownload
5Lecture 5 : Factor group, Homomorphism, IsomorphismDownload
6Lecture 6 : Conjugacy ClassesDownload
7Lecture 7 : Permutation GroupsDownload
8Lecture 8 : Cycle StructureDownload
9Lecture 9 : Cycle Structure ContinuedDownload
10Lecture 10 : Young Diagram and Molecular SymmetryDownload
11Lecture 11 : Point GroupsDownload
12Lecture 12 : Symmetries of Molecules, Schoenflies NotationDownload
13Lecture 13 : Symmetries of Molecules, Stereographic ProjectionDownload
14Lecture 14 : Examples of Molecular Symmetries and Proof of Cayley TheoremDownload
15Lecture 15 : Matrix Representation of Groups - IDownload
16Lecture 16 : Matrix Representation of Groups - IIDownload
17Lecture 17 : Reducible and Irreducible Representation - IDownload
18Lecture 18 : Reducible and Irreducible Representation - IIDownload
19Lecture 19 : Great Orthogonality Theorem and Character Table - IDownload
20Lecture 20 : Great Orthogonality Theorem and Character Table - IIDownload
21Lecture 21 : Mulliken Notation, Character Table and BasisDownload
22Lecture 22 : Tensor Product of RepresentationDownload
23Lecture 23 : Tensor Product and Projection Operator - IDownload
24Lecture 24 : Tensor Product and Projection Operator - IIDownload
25Lecture 25 : Tensor Product and Projection Operator with an exampleDownload
26Lecture 26 : Binary Basis and ObservablesDownload
27Lecture 27 : Selection RulesDownload
28Lecture 28 : Selection Rules and Molecular VibrationsDownload
29Lecture 29 : Molecular vibration normal modes: Classical Mechanics approachDownload
30Lecture 30 : Molecular vibration normal modes: Group Theory approachDownload
31Lecture 31 : Molecular vibration modes using projection operatorDownload
32Lecture 32 : Vibrational representation of characterDownload
33Lecture 33 : Infrared Spectra and Raman SpectraDownload
34Lecture 34 : Introduction to continuous groupDownload
35Lecture 35 : Generators of translational and rotational transformationDownload
36Lecture 36 : Generators of Lorentz transformationDownload
37Lecture 37 : Introduction to O(3) and SO(3) groupDownload
38Lecture 38 : SO(n) and Lorentz groupDownload
39Lecture 39 : Generalised orthogonal group and Lie algebraDownload
40Lecture 40 : Subalgebra of Lie algebraDownload
41Lecture 41 : gl(2,C) and sl(2,C) groupDownload
42Lecture 42 : U(n) and SU(n) groupDownload
43Lecture 43 : Symplectic groupDownload
44Lecture 44 : SU(2) and SU(3) groupsDownload
45Lecture 45 : Rank, weight and weight vectorDownload
46Lecture 46 : Weight vector, root vector, comparison between SU(2) and SU(3) algebra.Download
47Lecture 47 : Root diagram, simple roots, adjoint representationDownload
48Lecture 48 : SU(2) sub-algebra, Dynkin diagramsDownload
49Lecture 49 : Fundamental weights, Young diagrams, dimension of irreducible representation.Download
50Lecture 50 : Young diagrams and tensor productsDownload
51Lecture 51 : Tensor product, Wigner – Eckart theoremDownload
52Lecture 52 : Tensor product of irreducible representation 1: Composite objects from fundamental particlesDownload
53Lecture 53 : Tensor product of irreducible representation 2: Decimet and octet diagrams in the Quark ModelDownload
54Lecture 54 : Clebsch – Gordan coefficientsDownload
55Lecture 55 : 1) Quadrupole moment tensor (Wigner-Eckart theorem) 2) Decimet Baryon wavefunctionDownload
56Lecture 56 : Higher dimensional multiplets in the quark modelDownload
57Lecture 57 : Symmetry breaking in continuous groupsDownload
58Lecture 58 : Dynamical symmetry in hydrogen atom: SO(4) algebraDownload
59Lecture 59 : Hydrogen atom energy spectrum and degeneracy using Runge-Lenz vectorDownload

Sl.No Chapter Name English
1Lecture 1 : Introduction IDownload
Verified
2Lecture 2 : Introduction IIDownload
Verified
3Lecture 3 : Normal subgroup, Coset, Conjugate groupDownload
Verified
4Lecture 4 : Factor group, Homomorphism, IsomorphismDownload
Verified
5Lecture 5 : Factor group, Homomorphism, IsomorphismDownload
Verified
6Lecture 6 : Conjugacy ClassesDownload
Verified
7Lecture 7 : Permutation GroupsDownload
Verified
8Lecture 8 : Cycle StructureDownload
Verified
9Lecture 9 : Cycle Structure ContinuedDownload
Verified
10Lecture 10 : Young Diagram and Molecular SymmetryDownload
Verified
11Lecture 11 : Point GroupsDownload
Verified
12Lecture 12 : Symmetries of Molecules, Schoenflies NotationDownload
Verified
13Lecture 13 : Symmetries of Molecules, Stereographic ProjectionDownload
Verified
14Lecture 14 : Examples of Molecular Symmetries and Proof of Cayley TheoremDownload
Verified
15Lecture 15 : Matrix Representation of Groups - IDownload
Verified
16Lecture 16 : Matrix Representation of Groups - IIDownload
Verified
17Lecture 17 : Reducible and Irreducible Representation - IDownload
Verified
18Lecture 18 : Reducible and Irreducible Representation - IIDownload
Verified
19Lecture 19 : Great Orthogonality Theorem and Character Table - IDownload
Verified
20Lecture 20 : Great Orthogonality Theorem and Character Table - IIDownload
Verified
21Lecture 21 : Mulliken Notation, Character Table and BasisDownload
Verified
22Lecture 22 : Tensor Product of RepresentationDownload
Verified
23Lecture 23 : Tensor Product and Projection Operator - IDownload
Verified
24Lecture 24 : Tensor Product and Projection Operator - IIDownload
Verified
25Lecture 25 : Tensor Product and Projection Operator with an exampleDownload
Verified
26Lecture 26 : Binary Basis and ObservablesDownload
Verified
27Lecture 27 : Selection RulesDownload
Verified
28Lecture 28 : Selection Rules and Molecular VibrationsDownload
Verified
29Lecture 29 : Molecular vibration normal modes: Classical Mechanics approachDownload
Verified
30Lecture 30 : Molecular vibration normal modes: Group Theory approachDownload
Verified
31Lecture 31 : Molecular vibration modes using projection operatorDownload
Verified
32Lecture 32 : Vibrational representation of characterDownload
Verified
33Lecture 33 : Infrared Spectra and Raman SpectraDownload
Verified
34Lecture 34 : Introduction to continuous groupDownload
Verified
35Lecture 35 : Generators of translational and rotational transformationDownload
Verified
36Lecture 36 : Generators of Lorentz transformationDownload
Verified
37Lecture 37 : Introduction to O(3) and SO(3) groupDownload
Verified
38Lecture 38 : SO(n) and Lorentz groupDownload
Verified
39Lecture 39 : Generalised orthogonal group and Lie algebraDownload
Verified
40Lecture 40 : Subalgebra of Lie algebraDownload
Verified
41Lecture 41 : gl(2,C) and sl(2,C) groupDownload
Verified
42Lecture 42 : U(n) and SU(n) groupDownload
Verified
43Lecture 43 : Symplectic groupDownload
Verified
44Lecture 44 : SU(2) and SU(3) groupsDownload
Verified
45Lecture 45 : Rank, weight and weight vectorDownload
Verified
46Lecture 46 : Weight vector, root vector, comparison between SU(2) and SU(3) algebra.Download
Verified
47Lecture 47 : Root diagram, simple roots, adjoint representationDownload
Verified
48Lecture 48 : SU(2) sub-algebra, Dynkin diagramsDownload
Verified
49Lecture 49 : Fundamental weights, Young diagrams, dimension of irreducible representation.Download
Verified
50Lecture 50 : Young diagrams and tensor productsDownload
Verified
51Lecture 51 : Tensor product, Wigner – Eckart theoremDownload
Verified
52Lecture 52 : Tensor product of irreducible representation 1: Composite objects from fundamental particlesDownload
Verified
53Lecture 53 : Tensor product of irreducible representation 2: Decimet and octet diagrams in the Quark ModelDownload
Verified
54Lecture 54 : Clebsch – Gordan coefficientsDownload
To be verified
55Lecture 55 : 1) Quadrupole moment tensor (Wigner-Eckart theorem) 2) Decimet Baryon wavefunctionDownload
To be verified
56Lecture 56 : Higher dimensional multiplets in the quark modelDownload
To be verified
57Lecture 57 : Symmetry breaking in continuous groupsDownload
To be verified
58Lecture 58 : Dynamical symmetry in hydrogen atom: SO(4) algebraDownload
To be verified
59Lecture 59 : Hydrogen atom energy spectrum and degeneracy using Runge-Lenz vectorDownload
To be verified


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