Free duals and a new universal property for stable equivariant homotopy theory

Abstract

We study the left adjoint D to the forgetful functor from the ∞-category of symmetric monoidal ∞-categories with duals and finite colimits to the ∞-category of symmetric monoidal ∞-categories with finite colimits, and related free constructions. The main result is that D C always splits as the product of 3 factors, each characterized by a certain universal property. As an application, we show that, for any compact Lie group G, the ∞-category of genuine G-spectra is obtained from the ∞-category of Bredon (a.k.a ``naive") G-spectra by freely adjoining duals for compact objects, while respecting colimits.