The classical Lie algebras

Related lectures (32)

Page 1 of 4

Covers the Chinese remainder theorem for commutative rings and integers, polynomial rings, and Euclidean domains.

Covers a general introduction and discusses algebra, emphasizing the importance of unique factorization in algebraic structures.

Explores congruence relations in rings, principal ideals, ring homomorphisms, and the characteristic of rings.

Explores irreducible factors, Noetherian rings, ideal stability, and unique factorization in rings.

Explores the Chinese Remainder Theorem for Euclidean domains and the properties of commutative rings and fields.

Covers the concepts of ideals, principal ideal domains, and ring homomorphisms.

Explores associativity, Lie algebra, Lie groups, relativity, and symmetry preservation in quantum field theory.

Explores discrete valuation rings, their properties, uniqueness of representation, and relationship with principal ideal domains.

Explores Lie Algebra's connection to Group Theory through associative operations and Jacobi identities.

Explores Wedderburn's theorem, group algebras, and Maschke's theorem in the context of finite dimensional simple algebras and their endomorphisms.