The closure of ideals of $\boldsymbol{\ell^1(Σ)}$ in its enveloping $\boldsymbol{\mathrm{C}^\ast}$-algebra
Abstract: If $X$ is a compact Hausdorff space and $\sigma$ is a homeomorphism of $X$, then an involutive Banach algebra $\ell1(\Sigma)$ of crossed product type is naturally associated with the topological dynamical system $\Sigma=(X,\sigma)$. We initiate the study of the relation between two-sided ideals of $\ell1(\Sigma)$ and ${\mathrm C}\ast(\Sigma)$, the enveloping $\mathrm{C}\ast$-algebra ${\mathrm C}(X)\rtimes_\sigma \mathbb Z$ of $\ell1(\Sigma)$. Among others, we prove that the closure of a proper two-sided ideal of $\ell1(\Sigma)$ in ${\mathrm C}\ast(\Sigma)$ is again a proper two-sided ideal of ${\mathrm C}\ast(\Sigma)$.
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