Relatively projection and quasi-Green correspondents. (Q1879053)

The quasi-Green correspondence was introduced for modules over group algebras by \textit{P. Landrock} and \textit{G. O. Michler} [Math. Ann. 232, 205-238 (1978; Zbl 0355.20012)]. Further results were obtained by \textit{L. Héthelyi}, \textit{M. Szőke} and \textit{K. Lux} [Commun. Algebra 26, No. 1, 83-95 (1998; Zbl 0906.20002)]. In the paper under review, the concept is extended to points on a \(G\)-algebra \(A\), where \(G\) is a finite group. A point \(\beta\) of a subgroup \(H\) of \(G\) on \(A\) is called a quasi-Green correspondent of a point \(\alpha\) of \(G\) on \(A\) if \(H_\beta\leq G_\alpha\) and if \(G_\alpha\) is relatively projective with respect to \(H_\beta\) but not relatively projective with respect to \(H_{\beta'}\) for any point \(\beta'\neq\beta\) of \(H\) on \(A\). In this case, \(G_\alpha\) and \(H_\beta\) have a common defect pointed group \(P_\gamma\), and \(N_G(H_\beta)=N_G(H)\). The authors point out connections between the quasi-Green correspondence and the Puig and Green correspondences for pointed groups.