Galois Theory

🏃🏽‍♀️Galois Theory Unit 8 – The Fundamental Theorem of Galois Theory

The Fundamental Theorem of Galois Theory is a cornerstone of abstract algebra, linking field extensions to group theory. It establishes a correspondence between intermediate fields of a Galois extension and subgroups of its Galois group, providing a powerful tool for understanding algebraic structures. This theorem has far-reaching applications in solving polynomial equations, determining geometric constructibility, and exploring algebraic number theory. It's crucial for students to grasp its key concepts, historical context, and practical implications to fully appreciate its significance in modern mathematics.

Study Guides for Unit 8

8.1

Statement and proof of the Fundamental Theorem

4 min read

8.2

Correspondence between subfields and subgroups

6 min read

8.3

Applications of the Fundamental Theorem

4 min read

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Key Concepts and Definitions

Galois group the group of automorphisms of a field extension that fixes the base field
Field extension a larger field that contains a given base field
Splitting field the smallest field extension of a base field over which a given polynomial splits into linear factors
Normal extension a field extension that is the splitting field of a family of polynomials
Separable polynomial a polynomial whose roots are distinct in an algebraic closure
- Separable extension a field extension generated by a separable polynomial
Fixed field the subfield of elements fixed by a group of automorphisms
Correspondence a bijective map between intermediate fields and subgroups of the Galois group

Historical Context and Development

Évariste Galois (1811-1832) developed the theory in the early 19th century
- Galois aimed to solve the long-standing problem of finding a general solution to polynomial equations of degree 5 or higher
Building upon the works of Abel, Ruffini, and Lagrange on permutations and equations
Galois introduced the concept of a group (now called Galois group) to study field extensions
- He established a connection between the structure of these groups and the solvability of equations
Tragically, Galois died at the age of 20 in a duel, leaving behind unpublished manuscripts
Later mathematicians, such as Liouville and Jordan, recognized the importance of Galois' work and further developed the theory

Statement of the Fundamental Theorem

The Fundamental Theorem of Galois Theory establishes a correspondence between the intermediate fields of a Galois extension and the subgroups of its Galois group
Specifically, for a Galois extension $L/K$ $L / K$ with Galois group $G$ $G$ , the theorem states:
1. There is a one-to-one correspondence between the intermediate fields of $L/K$ and the subgroups of $G$
2. The correspondence reverses inclusions, i.e., if $H_1 \subseteq H_2$ are subgroups of $G$ , then $L^{H_2} \subseteq L^{H_1}$ , where $L^H$ denotes the fixed field of $H$
3. $[L:L^H] = |H|$ and $[L^H:K] = [G:H]$ , where $[L:K]$ denotes the degree of the extension and $|H|$ is the order of the subgroup
The theorem provides a powerful tool for understanding the structure of field extensions and their associated Galois groups

Main Components and Their Relationships

Galois extension a field extension $L/K$ $L / K$ such that $L$ $L$ is the splitting field of a separable polynomial over $K$ $K$
- Equivalently, $L/K$ is normal and separable
Galois group $\text{Gal}(L/K)$ the group of $K$ -automorphisms of $L$ , i.e., automorphisms of $L$ that fix $K$
Intermediate fields fields $F$ $F$ such that $K \subseteq F \subseteq L$ $K \subseteq F \subseteq L$
- The Galois correspondence maps each intermediate field $F$ to its Galois group $\text{Gal}(L/F)$ , a subgroup of $\text{Gal}(L/K)$
Fixed fields for a subgroup $H \leq \text{Gal}(L/K)$ $H \leq Gal (L / K)$ , the fixed field $L^H = \{x \in L : \sigma(x) = x \text{ for all } \sigma \in H\}$ $L^{H} = {x \in L : σ (x) = x for all σ \in H}$
- The Galois correspondence maps each subgroup $H$ to its fixed field $L^H$ , an intermediate field of $L/K$

Proof Outline and Key Steps

Show that the fixed field of a subgroup is an intermediate field
- Let $H \leq \text{Gal}(L/K)$ and show that $K \subseteq L^H \subseteq L$
Show that the Galois group of an intermediate field is a subgroup
- Let $F$ be an intermediate field of $L/K$ and show that $\text{Gal}(L/F) \leq \text{Gal}(L/K)$
Prove that the correspondence is bijective
- Show that $H = \text{Gal}(L/L^H)$ for any subgroup $H \leq \text{Gal}(L/K)$
- Show that $F = L^{\text{Gal}(L/F)}$ for any intermediate field $F$ of $L/K$
Establish the properties of the correspondence
- Prove that the correspondence reverses inclusions
- Prove the formulas relating degrees and orders: $[L:L^H] = |H|$ and $[L^H:K] = [G:H]$

Applications and Examples

Solving polynomial equations determining the solvability of a polynomial equation by radicals based on the structure of its Galois group
- Example: the general quintic equation $ax^5 + bx^4 + cx^3 + dx^2 + ex + f = 0$ is not solvable by radicals because its Galois group is $S_5$ , which is not solvable
Constructibility problems using Galois theory to determine which geometric constructions are possible with compass and straightedge
- Example: the angle $\pi/7$ is not constructible because the Galois group of the splitting field of $x^7 - 1$ over $\mathbb{Q}$ is not a 2-group
Algebraic number theory studying the Galois groups of extensions of $\mathbb{Q}$ $Q$ and their connections to number-theoretic properties
- Example: the Galois group of the splitting field of $x^3 - 2$ over $\mathbb{Q}$ is $S_3$ , which provides information about the arithmetic of $\sqrt[3]{2}$
Inverse Galois problem the question of which groups can occur as Galois groups of extensions of a given field (usually $\mathbb{Q}$ $Q$ )
- Example: the cyclic group $C_n$ is realizable as a Galois group over $\mathbb{Q}$ for any $n$ , as seen in the splitting field of $x^n - 1$

Common Misconceptions and Pitfalls

Not every field extension is Galois the Fundamental Theorem only applies to Galois extensions, which are normal and separable
The Galois group is not always abelian even for simple extensions like $\mathbb{Q}(\sqrt[3]{2})$ , the Galois group is non-abelian ( $S_3$ )
The Galois correspondence is not always trivial for a Galois extension $L/K$ $L / K$ , there may be proper intermediate fields between $K$ $K$ and $L$ $L$
- Example: $\mathbb{Q}(\sqrt{2}, \sqrt{3})$ has three proper intermediate fields: $\mathbb{Q}(\sqrt{2})$ , $\mathbb{Q}(\sqrt{3})$ , and $\mathbb{Q}(\sqrt{6})$
Solvability by radicals is not equivalent to solvability of the Galois group a polynomial can have a solvable Galois group but not be solvable by radicals (e.g., $x^5 - x + 1$ )
The Galois group depends on the base field the same polynomial can have different Galois groups over different base fields
- Example: $x^2 - 2$ has Galois group $C_2$ over $\mathbb{Q}$ but trivial Galois group over $\mathbb{R}$

Further Implications and Extensions

Inverse Galois problem determining which groups can be realized as Galois groups over a given field
- The problem is still open for many classes of groups and fields
Galois representations studying the action of Galois groups on vector spaces and relating them to geometric and arithmetic properties
Galois cohomology using cohomological methods to study Galois modules and their connections to algebraic number theory and arithmetic geometry
Differential Galois theory extending the ideas of classical Galois theory to the context of differential equations
- Analogous to the classical case, differential Galois theory relates the solvability of differential equations to the structure of differential Galois groups
Grothendieck's Galois theory a vast generalization of Galois theory to the context of schemes and étale fundamental groups
- This approach has deep connections to algebraic geometry, number theory, and topology