Eckmann-Hilton arguments in equivariant higher algebra

Abstract

Let O and P be k- and -connected unital G-operads subject to the condition for all S that O(S) = if and only if P(S) = . We show that the Boardman-Vogt tensor product O P is (k + + 2)-connected; equivalently, O P-monoids in any (k + + 3)-category lift uniquely to incomplete semi-Mackey functors. As a consequence, we show that the smashing localizations on unital G-operads correspond precisely to unital N∞-operads, and hence to the (finite) poset of unital weak indexing systems by previous work of the author. Along the way we characterize -connectivity of a unital G-operad O equivalently as -connectivity of O-admissible Wirthm\"uller maps of O-monoid spaces. In the discrete case, under no connectivity assumptions, O P-monoids lift uniquely to incomplete semi-Mackey functors, recovering an Eckmann-Hilton argument for "Cp-unital magmas." In the limiting case of infinite tensor powers, we take the loops out of equivariant infinite loop space theory, constructing algebraic approximations to incompletely stable G-spectra over arbitrary transfer systems.