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Lecture
Ramification Theory: Residual Fields and Discriminant Ideal
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Dedekind Rings: Factorisation and Ideal Class Group
Explores Dedekind rings, factorisation, ideal class group, heredity, separable extensions, and matrix properties.
Dimension Theory of Rings
Explores the dimension theory of rings, focusing on chains of ideals and prime ideals.
Ramification and Structure of Finite Extensions
Explores ramification and structure of finite extensions of Qp, including unramified extensions and Galois properties.
Ramification Theory: Dedekind Recipe
Explores ramification theory, residue fields, Galois extensions, and decomposition groups in algebraic number theory.
Dedekind Rings: Integral Extensions and Noetherian Rings
Explores Dedekind rings, integral extensions, and noetherian rings in algebraic structures.
Purely Inseparable Decompositions
Explores purely inseparable decompositions, Galois property, and algebraic closures.
Galois Theory Fundamentals
Explores Galois theory fundamentals, including separable elements, decomposition fields, and Galois groups, emphasizing the importance of finite degree extensions and the structure of Galois extensions.
Separable Extensions: Dedekind Rings
Explores separable extensions and Dedekind rings, focusing on coefficients and prime ideals.
Decomposition & Inertia: Group Actions and Galois Theory
Explores decomposition groups, inertia subgroups, Galois theory, unramified primes, and cyclotomic fields in group actions and field extensions.
Properties of Finite Dimensional Algebras
Covers the properties of finite dimensional algebras and non-semisimple representations.
