Duoidal ∞-categories of operadic modules
Abstract
In this paper we study duoidal structures on ∞-categories of operadic modules. Let O be a small coherent ∞-operad and let P be an ∞-operad. If a P-monoidal ∞-category C has a sufficient supply of colimits, then we show that the ∞-category ModAO(C) of O-A-modules in C has a structure of (P,O)-duoidal ∞-category for any P-algebra object A.
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