Lectures related to Galois Theory Fundamentals

Explores Galois theory, unramified primes, roots of polynomials, and finite residual extensions.

Explores purely inseparable decompositions, Galois property, and algebraic closures.

Covers the concept of finite degree extensions in Galois theory, focusing on separable extensions.

Covers the proof of Hensel's Lemma and a review of field theory, including Newton's approximation and p-adic complex numbers.

Explores the Galois correspondence and solvability by radicals in polynomial equations.

Explores ramification and structure of finite extensions of Qp, including unramified extensions and Galois properties.

Explores decomposition groups, inertia subgroups, Galois theory, unramified primes, and cyclotomic fields in group actions and field extensions.

Covers the recap of Galois theory and emphasizes the transitivity of Galois groups.

Explores the dimension theory of rings, focusing on chains of ideals and prime ideals.

Covers the Galois correspondence, relating subgroups to intermediate fields.

Explores ramification theory, residual fields, and discriminant ideals in algebraic number theory.

Explores solvability by radicals in Galois theory and the Galois/Abel criterion for solvability.

Explores homomorphisms in topology and delves into Galois theory.

Covers the uniqueness of norm extension in finite fields and the construction of norms on finite extensions of Qp.

Explores the Galois theory of Qp, covering algebraic extensions, inertia groups, and cyclic properties.

Explores Galois theory with a focus on Dedekind rings and their unique factorization of fractional ideals.

Covers homomorphisms, algebraic extensions, cutting, splitting, and separable elements in Fok [x].

Explores Dedekind rings, factorisation, ideal class group, heredity, separable extensions, and matrix properties.

Explores Dedekind rings, integral closure, factorization of ideals, and Gauss' Lemma.

Covers the algebraic closure of Qp and the definition of p-adic complex numbers, exploring roots' continuous dependence on coefficients.