Get Math Help

GET TUTORING NEAR ME!

(800) 434-2582

By submitting the following form, you agree to Club Z!'s Terms of Use and Privacy Policy

    Home / Get Math Help

    Principal Ideal Ring

    Alternate name
    Definition

    For some authors (e.g., Bourbaki, 1964), the same as principal ideal domain. Most authors, however, do not require the ring to be an integral domain, and define a principal ring (sometimes also called a principal ideal ring) simply as a commutative unit ring (different from the zero ring) in which every ideal is principal, i.e., can be generated by a single element. Examples include the ring of integers Z, any field, and any polynomial ring in one variable over a field. While all Euclidean rings are principal rings, the converse is not true.

    Back to List | POWERED BY THE WOLFRAM LANGUAGE