I want to figure out the following question: How to get an $E_\infty$-ring from a commutative differential graded ring?
More precisely, let $\operatorname{cdga}$ be the ($1$-)category of cdgas, let $E_\infty\text{-ring}$ denote the $\infty$-category of $E_\infty$-rings. I'm searching for a functor $f\colon\operatorname{cdga}\rightarrow E_\infty\text{-ring}$ that satisfies the following properties:
(i) The composition functor $\operatorname{cdga}\stackrel{f}{\rightarrow} E_\infty\text{-ring}\rightarrow\operatorname{Sp}$ should be equivalent to the composition functor $\operatorname{cdga}\rightarrow\operatorname{Ch}(\mathbb{Z})\rightarrow\operatorname{Ch}(\mathbb{Z})[w^{-1}]\cong\mathcal{D}(\mathbb{Z})\rightarrow\operatorname{Sp}$.
(ii) The functor $f$ should give rise to the correct graded ring structure on the homotopy groups.
I've searched in the literature but failed to find an explicit reference. HA.7.1.4.6 seems to solve the associative case, but the analogous statement for the commutative case (HA.7.1.4.11) requires us to work over $\mathbb{Q}$.
I think a possible way to proceed is to prove that the functor $\operatorname{Ch}(\mathbb{Z})\rightarrow\operatorname{Ch}(\mathbb{Z})[w^{-1}]$ is lax symmetric monoidal (where the symmetric monoidal structure on the latter $\infty$-category is provided by HA.4.1.7.6), but I don't know how to prove this statement.
