The ∞-Categorical Eckmann-Hilton Argument
Abstract
We define a reduced ∞-operad P to be d-connected if the spaces P(n), of n-ary operations, are d-connected for all n0. Let P and Q be two reduced ∞-operads. We prove that if P is d1-connected and Q is d2-connected, then their Boardman-Vogt tensor product P is (d1+d2+2)-connected. We consider this to be a natural ∞-categorical generalization of the classical Eckmann-Hilton argument.
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