What are the essential number theory texts that every serious student of number theory should read?
My recommendations would be:
- Hardy and Wright: An Introduction to the Theory of Numbers (old but still a great read)
- Stewart and Tall: Algebraic Number Theory (a very readable introduction to ANT)
- Alan Baker: A Concise Introduction to the Theory of Numbers (brilliantly written)
- Ireland and Rosen: Classical Introduction to Modern Number Theory
There are two books on analytic number theory by Apostol which are both also masterpieces.
But definitely avoid A. Weil's book "Basic Number Theory", unless and until you are much more advanced.
I think that if you get another twenty answers, they will all mention Hardy & Wright. Your library might have it but you'll probably have to put in some kind of storage retrieval request.
I'm not sure if Old John's referring to this book:
- Ian Stewart & David Tall, Algebraic Number Theory and Fermat's Last Theorem, 3rd Ed. Natick, Massachusetts: A. K. Peters (2002)
That's a very good one. I also recommend:
- Ethan D. Bolker, Elementary Number Theory: An Algebraic Approach. Mineola, New York: Dover Publications (1969, reprinted 2007) (Beware the long list of errata, though).
- H. Davenport, The Higher Arithmetic, 7th ed. 1999, Cambridge University Press
- Benjamin Fine & Gerhard Rosenberger, Number Theory: An Introduction via the Distribution of Primes, Boston: Birkhäuser, 2007
- Ivan Niven and Herbert S. Zuckerman, An Introduction to the Theory of Numbers, New York: John Wiley (1980)
It might also be a good idea to look at books devoted to the Fibonacci numbers.
As for books to avoid: books that look like they were typeset on a typewriter or on Microsoft WordPad and books that make strange claims about how knowing number theory is directly correlated to capital investment success.