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$C^{\ast }$-algebra; $C^{\ast }$-bundle; sectional representation
We show that if Y is the Hausdorffization of the primitive spectrum of a $C^{\ast }$-algebra $A$ then $A$ is $\ast $-isomorphic to the $C^{\ast }$-algebra of sections vanishing at infinity of the canonical $C^{\ast }$-bundle over $Y$.
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