A monoidal Grothendieck construction for ∞-categories

Abstract

We construct a monoidal version of Lurie's un/straightening equivalence. In more detail, for any symmetric monoidal ∞-category C, we endow the ∞-category of coCartesian fibrations over C with a (naturally defined) symmetric monoidal structure, and prove that it is equivalent the Day convolution monoidal structure on the ∞-category of functors from C to Cat∞. In fact, we do this over any ∞-operad by categorifying this statement and thereby proving a stronger statement about the functors that assign to an ∞-category C its category of coCartesian fibrations on the one hand, and its category of functors to Cat∞ on the other hand.