Theory of Algebraic Numbers by HARRY POLLARD


Authors
HARRY POLLARD
ISBN
9780486404547
Published
Binding
Paperback
Dimensions
136 x 209mm

Detailed proofs and clear-cut explanations provide an excellent introduction to the elementary components of classical algebraic number theory in this concise, well-written volume.The authors, a pair of noted mathematicians, start with a discussion of divisibility and proceed to examine Gaussian primes (their determination and role in Fermat's theorem); polynomials over a field (including the Eisenstein irreducibility criterion); algebraic number fields; bases (finite extensions, conjugates and discriminants, and the cyclotomic field); and algebraic integers and integral bases. After establishing a firm introductory foundation, the text explores the uses of arithmetic in algebraic number fields; the fundamental theorem of ideal theory and its consequences; ideal classes and class numbers; and the Fermat conjecture (concluding with discussions of Pythagorean triples, units in cyclotomic fields, and Kummer's theorem). In addition to a helpful list of symbols and an index, a set of carefully chosen problems appears at the end of each chapter to reinforce mathematics covered. Students and teachers of undergraduate mathematics courses will find this volume a first-rate introduction to algebraic number theory.
Christmas Catalogue 2024 x BookFrenzy
16.99
RRP: $19.99
15% off RRP


This product is unable to be ordered online. Please check in-store availability.
Instore Price: $19.99
Enter your Postcode or Suburb to view availability and delivery times.

You might also like

Adam Spencers Maths 101
35.00
16.00
54% Off
Humble Pi
24.99
21.24
15% Off
Vector
44.99
38.24
15% Off
Weird Maths
24.99
7.50
70% Off
Speed Mathematics 3rd Ed
22.95
19.51
15% Off

RRP refers to the Recommended Retail Price as set out by the original publisher at time of release.
The RRP set by overseas publishers may vary to those set by local publishers due to exchange rates and shipping costs.
Due to our competitive pricing, we may have not sold all products at their original RRP.