Introductory Modern Algebra – A Historical Approach, Second Edition
A Historical Approach
Samenvatting
Praise for the First Edition
"Stahl offers the solvability of equations from the historical point of view...one of the best books available to support a one–semester introduction to abstract algebra."
CHOICE
Introductory Modern Algebra: A Historical Approach, Second Edition presents the evolution of algebra and provides readers with the opportunity to view modern algebra as a consistent movement from concrete problems to abstract principles. With a few pertinent excerpts from the writings of some of the greatest mathematicians, the Second Edition uniquely facilitates the understanding of pivotal algebraic ideas.
The author provides a clear, precise, and accessible introduction to modern algebra and also helps to develop a more immediate and well–grounded understanding of how equations lead to permutation groups and what those groups can inform us about such diverse items as multivariate functions and the 15–puzzle. Featuring new sections on topics such as group homomorphisms, the RSA algorithm, complex conjugation, the factorization of real polynomials, and the fundamental theorem of algebra, the Second Edition also includes:
An in–depth explanation of the principles and practices of modern algebra in terms of the historical development from the Renaissance solution of the cubic equation to Dedekind′s ideals
Historical discussions integrated with the development of modern and abstract algebra in addition to many new explicit statements of theorems, definitions, and terminology
A new appendix on logic and proofs, sets, functions, and equivalence relations
Over 1,000 new examples and multi–level exercises at the end of each section and chapter as well as updated chapter summaries
Introductory Modern Algebra: A Historical Approach, Second Edition is an excellent textbook for upper–undergraduate courses in modern and abstract algebra.
Specificaties
Inhoudsopgave
<p>1 The Early History 1</p>
<p>1.1 The Breakthrough 1</p>
<p>2 Complex Numbers 9</p>
<p>2.1 Rational Functions of Complex Numbers 9</p>
<p>2.2 Complex Roots 17</p>
<p>2.3 Solvability by Radicals I 23</p>
<p>2.4 Ruler and Compass Constructibility 26</p>
<p>2.5 Orders of Roots of Unity 36</p>
<p>2.6 The Existence of Complex Numbers∗ 38</p>
<p>3 Solutions of Equations 45</p>
<p>3.1 The Cubic Formula 45</p>
<p>3.2 Solvability by Radicals II 49</p>
<p>3.3 Other Types of Solutions∗ 50</p>
<p>4 Modular Arithmetic 57</p>
<p>4.1 Modular Addition, Subtraction, and Multiplication 57</p>
<p>4.2 The Euclidean Algorithm and Modular Inverses 62</p>
<p>4.3 Radicals in Modular Arithmetic∗ 69</p>
<p>4.4 The Fundamental Theorem of Arithmetic∗ 70</p>
<p>5 The Binomial Theorem and Modular Powers 75</p>
<p>5.1 The Binomial Theorem 75</p>
<p>5.2 Fermat′s Theorem and Modular Exponents 85</p>
<p>5.3 The Multinomial Theorem∗ 90</p>
<p>5.4 The Euler –Function∗ 92</p>
<p>6 Polynomials Over a Field 99</p>
<p>6.1 Fields and Their Polynomials 99</p>
<p>6.2 The Factorization of Polynomials 107</p>
<p>6.3 The Euclidean Algorithm for Polynomials 113</p>
<p>6.4 Elementary Symmetric Polynomials∗ 119</p>
<p>6.5 Lagrange′s Solution of the Quartic Equation∗ 125</p>
<p>7 Galois Fields 131</p>
<p>7.1 Galois′s Construction of His Fields 131</p>
<p>7.2 The Galois Polynomial 139</p>
<p>7.3 The Primitive Element Theorem 144</p>
<p>7.4 On the Variety of Galois Fields∗ 147</p>
<p>8 Permutations 155</p>
<p>8.1 Permuting the Variables of a Function I 155</p>
<p>8.2 Permutations 158</p>
<p>8.3 Permuting the Variables of a Function II 166</p>
<p>8.4 The Parity of a Permutation 169</p>
<p>9 Groups 183</p>
<p>9.1 Permutation Groups 183</p>
<p>9.2 Abstract Groups 192</p>
<p>9.3 Isomorphisms of Groups and Orders of Elements 199</p>
<p>9.4 Subgroups and Their Orders 206</p>
<p>9.5 Cyclic Groups and Subgroups 215</p>
<p>9.6 Cayley′s Theorem 218</p>
<p>10 Quotient Groups and their Uses 225</p>
<p>10.1 Quotient Groups 225</p>
<p>10.2 Group Homomorphisms 234</p>
<p>10.3 The Rigorous Construction of Fields 240</p>
<p>10.4 Galois Groups and Resolvability of Equations 253</p>
<p>11 Topics in Elementary Group Theory 261</p>
<p>11.1 The Direct Product of Groups 261</p>
<p>11.2 More Classifications 265</p>
<p>12 Number Theory 273</p>
<p>12.1 Pythagorean triples 273</p>
<p>12.2 Sums of two squares 278</p>
<p>12.3 Quadratic Reciprocity 285</p>
<p>12.4 The Gaussian Integers 293</p>
<p>12.5 Eulerian integers and others 304</p>
<p>12.6 What is the essence of primality? 310</p>
<p>13 The Arithmetic of Ideals 317</p>
<p>13.1 Preliminaries 317</p>
<p>13.2 Integers of a Quadratic Field 319</p>
<p>13.3 Ideals 322</p>
<p>13.4 Cancelation of Ideals 337</p>
<p>13.5 Norms of Ideals 341</p>
<p>13.6 Prime Ideals and Unique Factorization 343</p>
<p>13.7 Constructing Prime Ideals 347</p>
<p>14 Abstract Rings 355</p>
<p>14.1 Rings 355</p>
<p>14.2 Ideals 358</p>
<p>14.3 Domains 361</p>
<p>14.4 Quotients of Rings 367</p>
<p>A Excerpts: Al–Khwarizmi 377</p>
<p>B Excerpts: Cardano 383</p>
<p>C Excerpts: Abel 389</p>
<p>D Excerpts: Galois 395</p>
<p>E Excerpts: Cayley 401</p>
<p>F Mathematical Induction 405</p>
<p>G Logic, Predicates, Sets and Functions 413</p>
<p>G.1 Truth Tables 413</p>
<p>G.2 Modeling Implication 415</p>
<p>G.3 Predicates and their Negation 418</p>
<p>G.4 Two Applications 419</p>
<p>G.5 Sets 421</p>
<p>G.6 Functions 422</p>
<p>Biographies 427</p>
<p>Bibliography 431</p>
<p>Solutions to Selected Exercises 433</p>
<p>Index 440</p>
<p>Notation 444</p>