Map monoidales and duoidal ∞-categories
Abstract
In this paper we give an example of duoidal ∞-categories. We introduce map O-monoidales in an O-monoidal (∞,2)-category for an ∞-operad O. We show that the endomorphism mapping ∞-category of a map O-monoidale is a coCartesian ( op,O)-duoidal ∞-category. After that, we introduce a convolution product on the mapping ∞-category from an O-comonoidale to an O-monoidale. We show that the O-monoidal structure on the duoidal endomorphism mapping ∞-category of a map O-monoidale is equivalent to the convolution product on the mapping ∞-category from the dual O-comonoidale to the map O-monoidale.
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