Boundary path groupoids of generalized Boolean dynamical systems and their \(C^{\ast}\)-algebras (Q2084854)

Since the introduction of graph \(C^*\)-algebras [\textit{A. Kumjian} et al., Pac. J. Math. 184, No. 1, 161--174 (1998; Zbl 0917.46056); J. Funct. Anal. 144, No. 2, 505--541 (1997; Zbl 0929.46055)], a number of generalizations have been introduced: \(C^*\)-algebras of topological graphs [\textit{T. Katsura}, Trans. Am. Math. Soc. 356, No. 11, 4287--4322 (2004; Zbl 1049.46039)], higher rank graph \(C^*\)-algebras [\textit{A. Kumjian} and \textit{D. Pask}, New York J. Math. 6, 1--20 (2000; Zbl 0946.46044)], labelled graph \(C^*\)-algebras [\textit{T. Bates} and \textit{D. Pask}, J. Oper. Theory 57, No. 1, 207--226 (2007; Zbl 1113.46049)], \(C^*\)-algebras of Boolean dynamical systems [\textit{T. M. Carlsen} et al., J. Math. Anal. Appl. 450, No. 1, 727--768 (2017; Zbl 1365.37012)] and of \textit{generalized} Boolean dynamical systems [\textit{T. M. Carlsen} and \textit{E. J. Kang}, J. Math. Anal. Appl. 488, No. 1, Article ID 124037, 27 p. (2020; Zbl 1457.46069)] (a smart refinement of the previous class that allows to study weakly left-resolving normal labelled graph \(C^*\)-algebras in a broader context). A useful tool to study such families of algebras has been the use of groupoid models. Starting with graph \(C^*\)-algebras, this has been done for topological graph \(C^*\)-algebras (under mild hypotheses) [\textit{T. Katsura}, Acta Appl. Math. 108, No. 3, 617--624 (2009; Zbl 1193.46042)], for higher rank graph \(C^*\)-algebras [\textit{T. Yeend}, J. Oper. Theory 57, No. 1, 95--120 (2007; Zbl 1119.46312)], for twisted topological graph \(C^*\)-algebras [\textit{A. Kumjian} and \textit{H. Li}, J. Oper. Theory 78, No. 1, 201--225 (2017; Zbl 1449.46046)], for weakly left-resolving normal labelled graph \(C^*\)-algebras [\textit{G. Boava} et al., Bull. Braz. Math. Soc. (N.S.) 51, No. 3, 835--861 (2020; Zbl 1461.46068)], and for \(C^*\)-algebras of Boolean dynamical systems [\textit{T. M. Carlsen} and \textit{E. J. Kang}, J. Math. Anal. Appl. 488, No. 1, Article ID 124037, 27 p. (2020; Zbl 1457.46069)]. In some cases, the associated groupoids are Renault-Deaconu type groupoids, while in other cases they are Exel's tight groupoids associated to suitable inverse semigroups. In the paper under review, the authors associate, for any given generalized Boolean dynamical system, two topological groupoids: one of Renault-Deaconu type, and the other of Exel's type. They show that both groupoids are topologically isomorphic, and, moreover, that the groupoid \(C^*\)-algebra of these groupoids is \(*\)-isomorphic to the \(C^*\)-algebra of the generalized Boolean dynamical system.