Algebras for enriched ∞-operads

Abstract

Using the description of enriched ∞-operads as associative algebras in symmetric sequences, we define algebras for enriched ∞-operads as certain modules in symmetric sequences. For V a symmetric monoidal model category and O a -cofibrant operad in V for which the model structure on V can be lifted to one on O-algebras, we then prove that strict algebras in V are equivalent to ∞-categorical algebras in the symmetric monoidal ∞-category associated to V. We also show that for an ∞-operad O enriched in a suitable closed symmetric monoidal ∞-category V, we can equivalently describe O-algebras in V as morphisms of ∞-operads from O to a self-enrichment of V.