Galois theory

An introduction to one of the most celebrated theories of mathematics Galois theory is one of the jewels of mathematics. Its intrinsic beauty, dramatic history, and deep connections to other areas of mathematics give Galois theory an unequaled richness. David Cox's Galois Theory helps readers understand not only the elegance of the ideas but also where they came from and how they relate to the overall sweep of mathematics. Galois Theory covers classic applications of the theory, such as solvability by radicals, geometric constructions, and finite fields. The book also delves into more novel topics, including Abel's theory of Abelian equations, the problem of expressing real roots by real radicals (the casus irreducibilis), and the Galois theory of origami. Anyone fascinated by abstract algebra will find careful discussions of such topics as:* The contributions of Lagrange, Galois, and Kronecker* How to compute Galois groups* Galois's results about irreducible polynomials of prime or prime-squared degree* Abel's theorem about geometric constructions on the lemniscate With intriguing Mathematical and Historical Notes that clarify the ideas and their history in detail, Galois Theory brings one of the most colorful and influential theories in algebra to life for professional algebraists and students alike.

Preface. Notation. PART I: POLYNOMIALS. Chapter 1. Cubic Equations. Chapter 2. Symmetric Polynomials. Chapter 3. Roots of Polynomials. PART II: FIELDS. Chapter 4. Extension Fields. Chapter 5. Normal and Separable Extensions. Chapter 6. The Galois Group. Chapter 7. The Galois Correspondence. PART III: APPLICATIONS. Chapter 8. Solvability by Radicals. Chapter 9. Cyclotomic Extensions. Chapter 10. Geometric Constructions. Chapter 11. Finite Fields. PART IV: FURTHER TOPICS. Chapter 12. Lagrange, Galois, and Kronecker. Chapter 13. Computing Galois Groups. Chapter 14. Solvable Permutation Groups. Chapter 15. The Lemniscate. Appendix A: Abstract Algebra. Appendix B: Hints to Selected Exercises. References. Index.