On higher monoidal ∞-categories
Abstract
In this paper we introduce a notion of O-monoidal ∞-categories for a finite sequence O of ∞-operads, which is a generalization of the notion of higher monoidal categories in the setting of ∞-categories. We show that the ∞-category of coCartesian O-monoidal ∞-categories and right adjoint lax O-monoidal functors is equivalent to the opposite of the ∞-category of Cartesian O rev-monoidal ∞-categories and left adjoint oplax O rev-monoidal functors, where O rev is a sequence obtained by reversing the order of O.
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