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Advanced Number Theory
Eminent mathematician/teacher approaches algebraic number theory from historical standpoint. Demonstrates how concepts, definitions, and theories have evolved during last two centuries. Abounds with numerical examples, over 200 problems, many concrete, specific theorems. Includes numerous graphs and tables.
- GenresMathematics
288 pages, Paperback
First published August 1, 1980
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Displaying 1 - 2 of 2 reviews
March 12, 2016
This book is essentially a demonstration of the application of abstract algebra to number theory. It opens with the definition of congruence, residue classes, groups and quadratic residues. After some additional work with groups there is material on integral domains followed by the bulk of the book where the work is done on ideals.
Once the basic principles of integral domains and ideals is mentioned, the level of difficulty of the material is quickly ramped up. Significant background in the subject and in number theory are both essential for understanding.
This would be an excellent text for an advanced special topics or graduate level course. The melding of the two fundamental topics of number theory and abstract algebra is a demonstration of how two different disciplines can be combined to advance mathematics.
Once the basic principles of integral domains and ideals is mentioned, the level of difficulty of the material is quickly ramped up. Significant background in the subject and in number theory are both essential for understanding.
This would be an excellent text for an advanced special topics or graduate level course. The melding of the two fundamental topics of number theory and abstract algebra is a demonstration of how two different disciplines can be combined to advance mathematics.
February 18, 2021
Contains a good exposition of the proof of Dirichlet's theorem. The chapter on characters are well written.
Displaying 1 - 2 of 2 reviews