Algebraic Number Theory

Algebraic number theory is the branch of number theory that deals with algebraic numbers. Historically, algebraic number theory developed as a set of tools for solving problems in elementary number theory, namely Diophantine equations (i.e., equations whose solutions are integers or rational numbers). Using algebraic number theory, some of these equations can be solved by "lifting" from the field  of rational numbers to an algebraic extension  of .

More recently, algebraic number theory has developed into the abstract study of algebraic numbers and number fields themselves, as well as their properties.

REFERENCES:

Stewart, I. and Tall, D. Algebraic Number Theory and Fermat's Last Theorem, 3rd ed. Wellesley, MA: A K Peters, 2000.