On the parametrized Tate construction
Abstract
We introduce and study a genuine equivariant refinement of the Tate construction associated to an extension G of a finite group G by a compact Lie group K, which we call the parametrized Tate construction (-)tG K. Our main theorem establishes the coincidence of three conceptually distinct approaches to its construction when K is also finite: one via recollement theory for the K-free G-family, another via parametrized ambidexterity for G-local systems, and the last via parametrized assembly maps. We also show that (-)tG K uniquely admits the structure of a lax G-symmetric monoidal functor, thereby refining a theorem of Nikolaus and Scholze. Along the way, we apply a theorem of the second author to reprove a result of Ayala--Mazel-Gee--Rozenblyum on reconstructing a genuine G-spectrum from its geometric fixed points; our method of proof further yields a formula for the geometric fixed points of an F-complete G-spectrum for any G-family F.
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