Book:Emil Artin/Galois Theory/Second Edition With Additions and Revisions

Subject Matter

 * Galois Theory

Contents

 * $\text {I}$. LINEAR ALGEBRA
 * A. Fields
 * B. Vector Spaces
 * C. Homogeneous Linear Equations
 * D. Dependence and Independence of Vectors
 * E. Non-homogeneous Linear Equations
 * F. Determinants


 * $\text {II}$. Field Theory
 * A. Extension Fields
 * B. Polynomials
 * C. Algebraic Elements
 * D. Splitting Fields
 * E. Unique Decomposition of Polynomials into Irreducible Factors
 * F. Group Characters
 * G. Applications and Examples to Theorem 13
 * H. Normal Extensions
 * I. Finite Fields
 * J. Roots of Unity
 * K. Noether's Equations
 * L. Kummer's Fields
 * M. Simple Extensions
 * N. Existence of a Normal Basis
 * O. Theorem on Natural Irrationalities


 * $\text {III}$. Applications (by )
 * A. Solvable Groups
 * B. Permutation Groups
 * C. Solution of Equations by Radicals
 * D. The General Equation of Degree $n$
 * E. Solvable Equations of Prime Degree
 * F. Ruler and Compass Construction


 * Bibliography
 * Index



Source work progress
* : $\text I$. Linear Algebra: $\text A$. Fields