Suppose that $G$ is a groupoid acting on a small category $H$ in the sense of \cite[Definition 4]{NOT} and $H\times_\alpha G$ is the resulting semi-direct product category (as in \cite[Proposition 8]{NOT}). We show that there exists a subcategory $H_r \subseteq H$ satisfying some nice property called ``regularity'' such that $H_r \times_\alpha G = H\times_\alpha G$. Moreover, we show that there exists a so-called ``quasi action'' (see Definition \ref{quasi}) $\beta$ of $G$ on $C^*(H_r)$ (where $C^*(H_r)$ is the semigroupoid $C^*$-algebra as defined in \cite{EXE}) such that $C^*(H_r\times_\alpha G) = C^*(H_r)\times_\beta G$ (where the crossed product for $\beta$ is as defined in Definition \ref{cross}).
Crossed Products by Endomorphisms, Vector Bundles and Group Duality
Crossed products by endomorphisms, vector bundles and group duality, II
Classification of the crossed product $C(M)\times_θ\Z_p$ for certain pairs $(M,θ)$
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