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Algebraic Theory of Quadratic Numbers [Paperback]

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  • Category: Books (Mathematics)
  • Author:  Trifkovi, Mak
  • Author:  Trifkovi, Mak
  • ISBN-10:  1461477166
  • ISBN-10:  1461477166
  • ISBN-13:  9781461477167
  • ISBN-13:  9781461477167
  • Publisher:  Springer
  • Publisher:  Springer
  • Pages:  216
  • Pages:  216
  • Binding:  Paperback
  • Binding:  Paperback
  • Pub Date:  01-Feb-2013
  • Pub Date:  01-Feb-2013
  • SKU:  1461477166-11-SPRI
  • SKU:  1461477166-11-SPRI
  • Item ID: 100714120
  • List Price: $69.99
  • Seller: ShopSpell
  • Ships in: 5 business days
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  • Delivery by: Nov 24 to Nov 26
  • Notes: Brand New Book. Order Now.

By focusing on quadratic numbers, this advanced undergraduate or masters level textbook on algebraic number theory is accessible even to students who have yet to learn Galois theory. The techniques of elementary arithmetic, ring theory and linear algebra are shown working together to prove important theorems, such as the unique factorization of ideals and the finiteness of the ideal class group.? The book concludes with two topics particular to quadratic fields: continued fractions and quadratic forms.? The treatment of quadratic forms is somewhat more advanced? than usual, with an emphasis on their connection with ideal classes and a discussion of Bhargava cubes.

The numerous exercises in the text offer the reader hands-on computational experience with elements and ideals in quadratic number fields.? The reader is also asked to fill in the details of proofs and develop extra topics, like the theory of orders.? Prerequisites include elementary number theory and a basic familiarity with ring theory.

This book shows the techniques of elementary arithmetic, ring theory and linear algebra working together to prove important theorems, such as the unique factorization of ideals and the finiteness of the ideal class group. Includes numerous exercises.

By focusing on quadratic numbers, this advanced undergraduate or masters level textbook on algebraic number theory is accessible even to students who have yet to learn Galois theory. The techniques of elementary arithmetic, ring theory and linear algebra are shown working together to prove important theorems, such as the unique factorization of ideals and the finiteness of the ideal class group.? The book concludes with two topics particular to quadratic fields: continued fractions and quadratic forms.? The treatment of quadratic forms is somewhat more advanced? than usual, with an emphasis on their connection with ideal classes and a discussion of Bhargava cubes.

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