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First Course in Abstract Algebra, A ,7th edition::9781292037592R180

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Published by Pearson (August 29, 2013) © 2014

John B. Fraleigh
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    ISBN-13: 9781292037592R180

    First Course in Abstract Algebra, A ,7th edition

    Published 2014

    Language: English

     

    Considered a classic by many, A First Course in Abstract Algebra is an in-depth introduction to abstract algebra. Focused on groups, rings and fields, this text gives students a firm foundation for more specialised work by emphasising an understanding of the nature of algebraic structures.

     

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    • 0. Sets and Relations.
    • I. GROUPS AND SUBGROUPS.
    • 1. Introduction and Examples.
    • 2. Binary Operations.
    • 3. Isomorphic Binary Structures.
    • 4. Groups.
    • 5. Subgroups.
    • 6. Cyclic Groups.
    • 7. Generators and Cayley Digraphs.
    • I. PERMUTATIONS, COSETS, AND DIRECT PRODUCTS.
    • 8. Groups of Permutations.
    • 9. Orbits, Cycles, and the Alternating Groups.
    • 10. Cosets and the Theorem of Lagrange.
    • 11. Direct Products and Finitely Generated Abelian Groups.
    • 12. Plane Isometries.
    • III. HOMOMORPHISMS AND FACTOR GROUPS.
    • 13. Homomorphisms.
    • 14. Factor Groups.
    • 15. Factor-Group Computations and Simple Groups.
    • 16. Group Action on a Set.
    • 17. Applications of G-Sets to Counting.
    • IV. RINGS AND FIELDS.
    • 18. Rings and Fields.
    • 19. Integral Domains.
    • 20. Fermat's and Euler's Theorems.
    • 21. The Field of Quotients of an Integral Domain.
    • 22. Rings of Polynomials.
    • 23. Factorization of Polynomials over a Field.
    • 24. Noncommutative Examples.
    • 25. Ordered Rings and Fields.
    • V. IDEALS AND FACTOR RINGS.
    • 26. Homomorphisms and Factor Rings.
    • 27. Prime and Maximal Ideas.
    • 28. Gröbner Bases for Ideals.
    • VI. EXTENSION FIELDS.
    • 29. Introduction to Extension Fields.
    • 30. Vector Spaces.
    • 31. Algebraic Extensions.
    • 32. Geometric Constructions.
    • 33. Finite Fields.
    • VII. ADVANCED GROUP THEORY.
    • 34. Isomorphism Theorems.
    • 35. Series of Groups.
    • 36. Sylow Theorems.
    • 37. Applications of the Sylow Theory.
    • 38. Free Abelian Groups.
    • 39. Free Groups.
    • 40. Group Presentations.
    • VIII.. AUTOMORPHISMS AND GALOIS THEORY.
    • 41. Automorphisms of Fields.
    • 42. The Isomorphism Extension Theorem.
    • 43. Splitting Fields.
    • 44. Separable Extensions.
    • 45. Totally Inseparable Extensions.
    • 46. Galois Theory.
    • 47. Illustrations of Galois Theory.
    • 48. Cyclotomic Extensions.
    • 49. Insolvability of the Quintic.
    • Appendix: Matrix Algebra.
    • Notations. 
    • Index.
    !