Universal Properties of Variations of the Little Cubes Operads
Abstract
Given a map B BTop(n) of spaces, one can define a version EB of the little cubes operad, whose construction is due to Lurie. We show that EB enjoys the universal property that, for every ∞-operad O, an operad map EB is equivalent to a Top(n)-equivariant map B×BTop(n)ETop(n)Map(En,O). This gives us an explicit diagram exhibiting EB as a colimit of En parametrized by B. It also shows that locally constant factorization algebras satisfy descent, reproving a recent theorem of Matsuoka.
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