A well known result on polynomial rings states that, for a given ring $R$, if $R$ has no non-zero nil ideals then the polynomial ring $R$(x) is semiprimitive, see for example (5) p.12. In this note we study Ore extensions of the form $R$(x,δ), where δ is an automorphism on the ring $R$, with the aim of relating the question of the semiprimitivity of $R$(x,δ) to the presence of non-zero nil ideals in $R$. In particular we show that under certain chain conditions the Jacobson radical of $R$(x,δ) consists precisely of polynomials over the nilpotent radical of $R$. Without restriction on $R$ we show that if δ has finite order then $R$(x,δ) is semiprimitive if $R$ has no nil ideals. Some conditions are required on $R$ and δ for results of the above nature to be true, as illustrated in §5 by an example of a semiprimitive ring $R$ having an automorphism δ of infinite order such that $R$(x,δ) has nil ideals.
[1]
Camilla Jordan.
The Jacobson Radical of the Group Ring of a Generalised Free Product
,
1975
.
[2]
D. Jordan.
Noetherian Ore Extensions and Jacobson Rings
,
1975
.
[3]
A. Goldie,et al.
Ore Extensions and Polycyclic Group Rings
,
1974
.
[4]
T. Lenagan.
The Nil Radical of a Ring with Krull Dimension
,
1973
.
[5]
I. Herstein.
Topics In Ring Theory
,
1969
.
[6]
D. A. Wallace.
The Jacobson radicals of the group algebras of a group and of certain normal subgroups
,
1967
.
[7]
N. Jacobson.
Structure of rings
,
1956
.
[8]
Nathan Jacobson,et al.
Theory of rings
,
1943
.