Description: ring of rational polynomials over the finite field of $p$ elements

Notes: Is a field that isn't perfect

Keywords rational polynomial ring

Reference(s):

This ring has the following properties:

ACC principal
Artinian
atomic domain
Bezout domain
Bezout ring
clean
Cohen-Macaulay
coherent
connected
continuous
Dedekind domain
distributive
domain
dual
Euclidean domain
field
finitely pseudo Frobenius
Frobenius
GCD domain
Gorenstein
Jacobson
local
Noetherian
normal
normal domain
perfect
principal ideal domain
principal ideal ring
Prufer domain
pseudo Frobenius
rad-nil
reduced
regular
regular local
Schreier domain
self-injective
semilocal
semiperfect
semiprimary
semiprimitive
semiregular
semisimple
serial
stable range 1
strongly pi regular
unique factorization domain
valuation
von Neumann regular

The ring lacks the following properties:

We don't know if the ring has or lacks the following properties: