Simplicial localization of monoidal structures, and a non-linear version of Deligne's conjecture

Abstract

We show that if (M,,I) is a monoidal model category then M(I) is a (weak) 2-monoid in . This applies in particular when M is the category of A-bimodules over a simplicial monoid A: the derived endomorphisms of A then form its Hochschild cohomology, which therefore becomes a simplicial 2-monoid.

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