Rigidity of the category of localizing motives

Abstract

In this paper we study the category of localizing motives Motloc -- the target of the universal finitary localizing invariant of idempotent-complete stable categories as defined by Blumberg-Gepner-Tabuada. We prove that this (presentable stable) category is rigid symmetric monoidal in the sense of Gaitsgory and Rozenblyum. In particular, it is dualizable. More precisely, we prove a more general version of this result for the category MotlocE -- the target of the universal finitary localizing invariant of dualizable modules over a rigid symmetric monoidal category E. We obtain general results on morphisms and internal Hom in the categories MotlocE of localizing motives. As an application we compute the morphisms in multiple non-trivial examples. In particular, we prove the corepresentability statements for TR (topological restriction) and TC (topological cyclic homology) when restricted to connective E1-rings. As a corollary, for a connective E∞-ring R we obtain a TR(R)-module structure on the nil K-theory spectrum NK(R). We also apply the rigidity theorem to define refined versions of negative cyclic homology and periodic cyclic homology. This was announced previously in E24b, and certain very interesting examples were computed by Meyer and Wagner in MW24. Here we do several computations in characteristic 0, in particular showing that in seemingly innocuous situations the answer can be given by an interesting algebra of overconvergent functions.

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