Multipliers of Hilbert pro-\(C^*\)-bimodules and crossed products by Hilbert pro-\(C^*\)-bimodules (Q2814830)

\textit{I. Zarakas} [Rev. Roum. Math. Pures Appl. 57, No. 3, 289--310 (2012; Zbl 1289.46074)] introduced the notion of a Hilbert pro-\(C^*\)-bimodule over a pro-\(C^*\)-algebra. \textit{M. Joiţa} [Stud. Math. 185, No. 3, 263--277 (2008; Zbl 1146.46032)] investigated the structure of the multiplier module of a Hilbert pro-\(C^*\)-module. In the paper under review, the authors introduce the notion of multiplier of a Hilbert pro-\(C^*\)-bimodule and investigate its structure. They study the relationship between the crossed product \(A\times_X\mathbb{Z}\) of a pro-\(C^*\)-algebra \(A\) by a Hilbert pro-\(C^*\)-bimodule \(X\) over \(A\), the crossed product \(M(A)\times_{M(X)}\mathbb{Z}\) of the multiplier algebra \(M(A)\) by the multiplier bimodule \(M(X)\), and the multiplier algebra \(M(A\times_X\mathbb{Z})\). In addition, they show that, given an inverse limit automorphism \(\alpha\) of a non-unital pro-\(C^*\)-algebra \(A\), the crossed product of \(M(A)\) by the extension \(\overline{\alpha}\) of \(\alpha\) to \(M(A)\) can be identified with a pro-\(C^*\)-subalgebra of the multiplier algebra \(M(A \times_\alpha \mathbb{Z})\).