Control subgroups and birational extensions of graded rings (Q1301934)

Let \(R\) be a strongly \(G\)-graded ring and \(H\) a normal subgroup of \(G\). The author proves that \(R^{(H)}\subseteq R\) is a Zariski extension if and only if the filter \({\mathcal L}(R-P)\) is controlled by \(H\) for any prime ideal \(P\) in an open set of the Zariski topology on \(R\). As an application certain ideals of \(R\) and \(R^{(H)}\) are related up to radical.