On strongly \(FP_n\)-injective modules (Q6655006)

Recall that an \(R\)-module \(M\) is called strongly \(FP_n\)-injective if \(Ext^i_R(F, M) = 0\) for any positive integer \(i\) and any \(n\)-presented \(R\)-module \(F\), i.e., an \(R\)-module \(F\) which is fitting in the follow exact sequence \N\[\N\cdots \rightarrow P_n\rightarrow P_{n-1}\rightarrow\cdots \rightarrow P_0\rightarrow F\rightarrow0,\N\]\Nwhere each \(P_i\) is finitely generated projective.\N\NIn this paper, the authors proved that a ring \(R\) is \(n\)-coherent and self-strongly \(FP_n\)-injective if and only if \((\mathcal{SFI}_n,\mathcal{SFI}^{\perp}_n )\) is a (perfect) cotorsion pair, if and only if every R-module has an epimorphic \(\mathcal{SFI}_n\)-cover, where \(\mathcal{SFI}_n\) denotes the class of strongly \(FP_n\)-injective modules.\N\NIt is desired to study the following question:\N\NHow to characterize rings over which every \(R\)-module has an \(\mathcal{SFI}_n\)-(pre)cover.