In abstract algebra, a principal ideal domain (PID) is an integral domain in which every ideal is principal (that is, generated by a single element).
Examples are the ring of integers, all fields, and rings of polynomials in one variable with coefficients in a field. All euclidean domains are principal ideal domains, but the converse is not true.
An example of a non PID is the ring Z[X] of all polynomials with integer coefficients. It is not principal, since for example the ideal generated by 2 and X cannot be generated by a single polynomial.
Properties
In a principal ideal domain, any two elements have a greatest common divisor, and almost always have more than one.
Every principal ideal domain is a unique factorization domain (UFD).The converse does not hold since for any field K, K[X,Y] is a UFD but is not a PID (to prove this look at the ideal generated by 
. It is not the whole ring since it contains no polynomials of degree 0, but it cannot be generated by any one single element).
- Every principal ideal domain is Noetherian.
- In all rings, maximal ideals are prime. In principal ideal domains a near converse holds: every nonzero prime ideal is maximal.
- All principal ideal domains are integrally closed.
The previous three statements give the definition of a Dedekind domain, and hence every principal ideal domain is a Dedekind domain.
So that PID 
Dedekind 
UFD . However there is another theorem which states that any unique factorisation domain that is a Dedekind domain is also a principal ideal domain. Thus we get the reverse inclusion Dedekind UFD PID, but then this shows equality and hence, Dedekind UFD = PID.
An example of a principal ideal domain that is not a euclidean domain is the ring ![\mathbf{Z}\left[\frac{1+\sqrt{-19}}{2}\right]](a/../upload/math/8065eeb49ab3b234dda0f1d966b92c46.png)
(Wilson, J. C. "A Principal Ring that is Not a Euclidean Ring." Math. Mag. 34-38, 1973).
