Inductive limits of partial crossed products

Abstract

Let ((A(i), G, α(i)), φi)i ∈ N be an inductive sequence of partial dynamical systems. We prove the existence of an induced partial action α of G on the inductive limit A= A(i). We call α the inductive limit partial action. Furthermore, we show the corresponding partial crossed product AαG is canonically isomorphic to A(i)α(i)G. We also study the globalization of the inductive limit partial action α, its finite Rokhlin dimension and tracial states on AαG.

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