A Comparison of Takai and Treumann Dualities
Abstract
We prove a comparison result between two duality statements - Takai duality, which is implemented by the crossed product functor - G: KKG KK G on equivariant Kasparov categories; and Treumann duality, which asserts the existence of an exotic equivalence of stable ∞-categories Mod(KUp[G])ft Mod(KUp[ G])ft given by tensoring with a particular (G, G)-bimodule M.
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