Strongly typical representations of the basic classical Lie superalgebras (Q2758960)

Let \(\mathfrak g\) be a basic classical complex Lie superalgebra with a universal enveloping superalgebra \(U\). Denote by \(Z(\mathfrak g)\) the center of \(U\). Let \(T\in Z(\mathfrak g)\) be a special even element as constructed in the author's paper [Ann. Inst. Fourier 50, 1745-1764 (2000; Zbl 1063.17006)]. A maximal ideal \(\chi\) in \(Z(\mathfrak g)\) is strongly typical if \(T^2\) does not belong to \(\chi\). For a maximal ideal \(\chi\) in \(Z(\mathfrak g)\) denote by \(\text{gr} C_{\infty}\) the category of graded \(\mathfrak g\)-modules \(N\) such that each element of \(N\) is annihilated by \(\chi^r\) for some \(r\). It is shown that for a strongly typical maximal ideal \(\chi\) in \(Z(\mathfrak g)\) the category \(\text{gr} C_{\infty}\) is equivalent to a similar category \(\text{gr} C_{\infty}\) defined in terms of maximal ideal of \(Z(\mathfrak g_0)\).