Table of Contents

Preface — 1 Polynomials in one variable — 1.1 Polynomials with rational coefficients — 1.2 Polynomials with coefficients in Zp — 1.3 Polynomial division — 1.4 Common divisors of polynomials — 1.5 Units, irreducibles and the factor theorem — 1.6 Factorization into irreducible polynomials — 1.7 Polynomials with integer coefficients — 1.8 Factorization in Zp [x] and applications to Z[x] — 1.9 Factorization in Q[x] — 1.10 Factorizing with the aid of the computer — Summary of chapter 1 — Exercises for chapter 1 — 2 Using polynomials to make new number fields — 2.1 Roots of irreducible polynomials — 2.2 The splitting field of xP" - x in Zp [x] — Summary of chapter 2 — Exercises for chapter 2 — 3 Quadratic integers in general and Gaussian integers in particular — 3.1 Algebraic numbers — 3.2 Algebraic integers — 3.3 Quadratic numbers and quadratic integers — 3.4 The integers of Q(-J=T) — 3.5 Division with remainder in Z[i] — 3.6 Prime and composite integers in Z[i] — Summary of chapter 3 — Exercises for chapter 3 — 4 Arithmetic in quadratic domains — 4.1 Multiplicative norms — 4.2 Application of norms to units in quadratic domains — 4.3 Irreducible and prime quadratic integers — 4.4 Euclidean domains of quadratic integers — 4.5 Factorization into irreducible integers in quadratic — domains — Summary of chapter 4 — Exercises for chapter 4 — 5 Composite rational integers and sums of squares — 5.1 Rational primes — 5.2 Quadratic residues and the Legendre symbol — 5.3 Identifying the rational primes that become composite in a quadratic domain — 5.4 Sums of squares — Summary of chapter 5 — Exercises for chapter 5 — Appendices — 1 Abstract perspectives — 1.1 Groups — 1.2 Rings and integral domains — 1.3 Divisibility in integral domains — 1.4 Euclidean domains and factorization into irreducibles — 1.5 Unique factorization in Euclidean domains — 1.6 Integral domains and fields — 1.7 Finite fields — 2 The product of primitive polynomials — 3 The Mobius function and cyclotomic polynomials — 4 Rouches theorem — 5 Dirichlet's theorem and Pell's equation — 6 Quadratic reciprocity — References – Index.