Uniqueness of monoidal adjunctions
Abstract
There are two dual equivalences between the ∞-category of O-monoidal ∞-categories with right adjoint lax O-monoidal functors and that with left adjoint oplax O-monoidal functors, where O is an ∞-operad. We study the space of equivalences between these two ∞-categories, and show that the two equivalences equipped with compatible O-monoidal presheaf functors are canonically equivalent.
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