Descent of properties of rings and pairs of rings to fixed rings

Abstract

Let G be a group acting via ring automorphisms on an integral domain R. A ring-theoretic property of R is said to be G-invariant, if RG also has the property, where RG=\r∈ R \ | \ σ(r)=r \ for all \ σ∈ G\, the fixed ring of the action. In this paper we prove the following classes of rings are invariant under the operation R→ RG: locally pqr domains, Strong G-domains, G-domains, Hilbert rings, S-strong rings and root-closed domains. Further let P be a ring theoretic property and R⊂eq S be a ring extension. A pair of rings (R,S) is said to be a P-pair, if T satisfies P for each intermediate ring R⊂eq T⊂eq S. We also prove that the property P descends from (R,S)→ (RG, SG) in several cases. For instance, if P= Going-down, Pseudo-valuation domain and "finite length of intermediate chains of domains", we show each of these properties successfully transfer from (R,S)→ (RG, SG).