Lecture 1 - An Introduction to Lie Algebras
Lecture 2 - Lie subalgebra and Homomorphism
Lecture 3 - Some Problems
Lecture 4 - Ideals and Quotient algebras
Lecture 5 - Isomorphism theorems
Lecture 6 - Correspondence between ideals
Lecture 7 - Low dimensional Lie algebra - 1
Lecture 8 - Low dimensional Lie algebra - 2
Lecture 9 - Some more definitions
Lecture 10 - Solvable and nilpotent Lie algebra
Lecture 11 - Nilpotent Lie algebra
Lecture 12 - The invariance Lemma
Lecture 13 - Engel's and Lie's Theorem
Lecture 14 - Engel's and Lie's Theorem (Continued...)
Lecture 15 - Lie's Theorem
Lecture 16 - Basics of Representation Theory
Lecture 17 - Basics of Representation Theory (Continued...)
Lecture 18 - Schur's lemma
Lecture 19 - Finite dimensional representations of of sl2(C)
Lecture 20 - Classification of finite dimensional representations of sl2(C)
Lecture 21 - Complete reducibility of finite dimensional representation of sl2(C) - Part 1
Lecture 22 - Complete reducibility of finite dimensional representation of sl2(C) - Part 2
Lecture 23 - Applications of Lie's and Engel's theorem
Lecture 24 - Applications of Weyl's Theorem for sl2(C)
Lecture 25 - New representations form given representations
Lecture 26 - Primary decomposition Theorem and Jordan-Chevalley decomposition
Lecture 27 - Cartan's criteria for solvability
Lecture 28 - Cartan's criteria for semisimplicity and its consequences
Lecture 29 - Abstract Jordan decomposition in semisimple Lie algebras
Lecture 30 - Casimir element of a representation of a semisimple Lie algebra
Lecture 31 - Weyl's Theorem of complete reducibility for semisimple Lie algebras
Lecture 32 - Root space decomposition of semisimple Lie algebras
Lecture 33 - Centralizer of a maximal toral subalgebra
Lecture 34 - Properties of roots
Lecture 35 - More properties of roots
Lecture 36 - Rationality of roots
Lecture 37 - Abstract root system and Weyl groups
Lecture 38 - Isomorphism of Root systems and dual root systems
Lecture 39 - Root systems of Ranks 1 and 2
Lecture 40 - Classification of rank 2 root systems
Lecture 41 - Base of a root system
Lecture 42 - Classification of bases
Lecture 43 - Basic properties of simple roots
Lecture 44 - Characterization of length function
Lecture 45 - Decomposition of root systems
Lecture 46 - Root lengths, Cartan Matrices
Lecture 47 - Cartan matrices and Dynkin diagrams
Lecture 48 - Classification of Root systems
Lecture 49 - Classification of Root systems (Continued...)
Lecture 50 - Concrete description of root systems
Lecture 51 - Uniqueness of root systems
Lecture 52 - Isomorphism theorem
Lecture 53 - Isomorphism theorem (Continued...)
Lecture 54 - Generators and relations
Lecture 55 - Serre presentation
