$mathrm{Mod}_{mathbb{H}\mathrm{k}$-enriched $\infty$-categories are left $mathbb{H}\mathrm{k}$-module objects of $\mathcal{C}at_{infty}^{mathcal{S}p}$ and $\mathcal{C}at_{\infty}^{mathcal{S}p}$-enriched $\infty$-functors
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$\mathrm{Mod}_{\mathbb{H}\mathrm{k}}$-enriched $\infty$-categories are left $\mathbb{H}\mathrm{k}$-module objects of $\mathcal{C}at_{\infty}^{\mathcal{S}p}$ and $\mathcal{C}at_{\infty}^{\mathcal{S}p}$-enriched $\infty$-functors
We establish the feasibility of investigating the theory of
$\mathrm{Mod}_{\mathbb{H}\mathrm{k}}$-enriched $\infty$-categories, where
$\mathbb{H}\mathrm{k}$ is the Eilenberg-Maclane Spectrum associated with a
commutative and unitary ring $k$, through the framework of
$\mathcal{S}p$-enriched $\infty$-category theory. In particular, we prove that
the $\infty$-category of $\mathrm{Mod}_{\mathbb{H}\mathrm{k}}$-enriched
$\infty$-categories
$\mathcal{C}at_{\infty}^{\mathrm{Mod}_{\mathbb{H}\mathrm{k}}}$,
$\infty$-category of left $\mathbb{H}\mathrm{k}$-module objects of the
$\infty$-category of $\mathcal{S}p$-enriched $\infty$-categories
$\mathcal{C}at_{\infty}^{\mathcal{S}p}$
$\mathrm{LMod}_{\mathbb{H}\mathrm{k}}(\mathcal{C}at_{\infty}^{\mathcal{S}p})$
and the $\infty$-category of $\mathcal{C}at_{\infty}^{\mathcal{S}p}$-enriched
$\infty$-functors
$Fun^{\mathcal{C}at_{\infty}^{\mathcal{S}p}}(\underline{\underline{\mathbb{H}\mathrm{k}}},\mathcal{C}at_{\infty}^{\mathcal{S}p})$
are equivalent.
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