Lecture 1 - Motivation of group theory
Lecture 2 - Definition of a group
Lecture 3 - Examples of groups
Lecture 4 - The symmetric group
Lecture 5 - Subgroups of integers
Lecture 6 - Basic properties of groups
Lecture 7 - Subgroups of a group
Lecture 8 - Subgroup generated by subsets of a group
Lecture 9 - Group of integers modulo n
Lecture 10 - Some elementary number theory - I
Lecture 11 - Some elementary number theory - II
Lecture 12 - Order of an elements in a group
Lecture 13 - Cyclic groups and its subgroups
Lecture 14 - Characterization of cyclic groups
Lecture 15 - Examples of cosets of a subgroup in a group
Lecture 16 - Cosets of a subgroup of a group
Lecture 17 - Lagrange's Theorem
Lecture 18 - Number theoretic applications of Lagrange's Theorem
Lecture 19 - Normal subgroup
Lecture 20 - Some useful definitions
Lecture 21 - Internal direct product
Lecture 22 - More on normal subgroups
Lecture 23 - Normalizer of a subgroup
Lecture 24 - First Isomorphism Theorem
Lecture 25 - Second Isomorphism Theorem
Lecture 26 - Third Isomorphism Theorem
Lecture 27 - Group acting on a set
Lecture 28 - Group action - Examples
Lecture 29 - Isometries of the plane is a group
Lecture 30 - Orthogonal maps
Lecture 31 - Dihedral groups
Lecture 32 - Finite subgroups of the orthogonal group
Lecture 33 - Group acting on a set
Lecture 34 - Group action - Examples
Lecture 35 - Orbit-decomposition Theorem
Lecture 36 - Stabilizer of a subset
Lecture 37 - Applications of group action
Lecture 38 - Class equation
Lecture 39 - Some more applications of group action
Lecture 40 - G-sets and morphisms
Lecture 41 - More examples
Lecture 42 - Burnside's lemma
Lecture 43 - The Sylow's theorems
Lecture 44 - The Sylow's theorems (Continued...)
Lecture 45 - Application of Sylow's Theorems
Lecture 46 - Semidirect product of groups
Lecture 47 - Automorphisms of groups
Lecture 48 - Symmetric and alternating groups
Lecture 49 - Conjugacy in the symmetric group
Lecture 50 - Conjugacy in the symmetric group (Continued...)
Lecture 51 - Simplicity of the alternating groups
Lecture 52 - The sign map
Lecture 53 - The sign map (Continued...)
Lecture 54 - Structure theorem for finite abelian groups (using invariant factors)
Lecture 55 - The structure theorem for finite abelian groups
Lecture 56 - Proof of the structure theorem for finite abelian groups (Continued...)
Lecture 57 - Proof of the structure theorem for finite abelian groups
Lecture 58 - Structure theory of finite abelian p-groups
