Crossed products by C₀(X)-actions

Suppose that $G$ has a representation group $H$, that $G_{ab}:= G/\bar{[G,G]}$ is compactly generated, and that $A$ is a \cs-algebra for which the complete regularization of $\Prim(A)$ is a locally compact Hausdorff space $X$. In a previous article, we showed that there is a bijection $\alpha \mapsto (Z_\alpha,f_\alpha)$ between the collection of exterior equivalence classes of locally inner actions $\alpha:G\to\Aut(A)$, and the collection of principal $\hgab$-bundles $Z_\alpha$ together with continuous functions $f_\alpha:X\to H^2(G,\T)$. In this paper, we compute the crossed products $A\rtimes_\alpha G$ in terms of the data $Z_\alpha$, $f_\alpha$, and~$\cs(H)$.