On products of skeleta

Abstract

Given a symmetric monoidal ∞-category E, compatible with finite colimits, we show that the functor sending a simplicial object in E to its skeletal filtration is canonically lax symmetric monoidal. This monoidal structure is the analogue of the one induced by the Eilenberg-Zilber homomorphism from the Dold-Kan correspondence. To accomplish this, we establish some new results around O-promonoidal ∞-categories for any ∞-operad O; most notably, we show that it is possible to localize O-promonoidal ∞-categories in the same way one localizes symmetric monoidal ∞-categories.

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