Property: Schreier domain
Definition: normal domain in which every element is primal
Reference(s):
(No citations retrieved.)
Metaproperties:
This property has the following metaproperties
- passes to polynomial rings
This property
does not have the following metaproperties
- passes to quotient rings
(Counterexample: $R_{ 49 }$ is a homomorphic image of $R_{ 27 }$)
- passes to subrings
(Counterexample: $R_{ 77 }$ is a subring of $R_{ 4 }$)
- stable under finite products
(Counterexample: $R_{ 9 }$)
- stable under products
(counterexample needed)
- forms an equational class
(counterexample needed)