Twisted partial group algebra and related topological partial dynamical system

Abstract

Given a group \( G \), a field \( \), and a factor set \( σ \) arising from a partial projective \( \)-representation of \( G \). This leads to the construction of a topological partial dynamical system \( (σ, G, θ) \), where \( σ \) is a compact, totally disconnected Hausdorff space, and \( σ \) acts as a twist for \( θ \). We show that the twisted partial group algebra \( parσ G \) can be realized as a crossed product \( L(σ) (θ, σ) G \), with \( L(σ) \) denoting the \( \)-algebra of locally constant functions \( σ \). The space \( σ \) corresponds to the spectrum of a unital commutative subalgebra in \( parσ G \), generated by idempotents. By describing \( σ \) as a subspace of the Bernoulli space \( 2G \), we examine conditions under which the spectral partial action \( θ \) is topologically free, impacting the ideal structure of \( parσ G \). We further explore generating idempotent factor sets of \( G \) and present conditions on them to ensure the topological freeness of \( θ \). Inspired by Exel's semigroup \( S(G) \), which governs partial actions and representations of \( G \) and relates to \( parG \), we characterize the twisted partial group algebra \( parσG \) as generated by a \( \)-cancellative inverse semigroup constructed from elements of \( σ \). When \( σ \) is discrete, we demonstrate that \( parσ G \) decomposes into a product of matrix algebras over twisted subgroup algebras, generalizing known results for finite \( G \).

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