Integrability of weight modules of degree 1 (Q2892867)

Let \(G\) be a simply connected real Lie group and \(\mathfrak{g}\) the complexification of the Lie algebra of \(G\). In the paper under review the author gives a classification of all simple weight \(\mathfrak{g}\)-modules for which all nonzero dimensions of weight spaces are equal to one and which integrate to continuous representations of \(G\) on some Hilbert space. Infinite dimensional modules with bounded weight multiplicities exist only in the case when \(\mathfrak{g}\cong\mathfrak{sl}_n\) or \(\mathfrak{g}\cong\mathfrak{sp}_n\) and the author uses explicit classification and construction of such modules in the proof.