A Criterion for Phantomness of dg-categories

Abstract

We study the question of whether the vanishing of additive invariants characterizes phantomness for smooth proper dg categories admitting geometric realizations. More precisely, let X be a smooth proper variety over a field k, and let ⊂ (X) be a k-linear admissible full dg subcategory. We construct a non-compact motive ()∈ (k,) and show that its l-adic realization recovers the K(1,l)-local algebraic K-theory of . Analogous statements are obtained for Betti and de Rham realizations, which recover topological K-theory and periodic cyclic homology, respectively. As a consequence, assuming that the Chow motive of X is Kimura-finite, we prove a criterion for phantomness: the vanishing of LK(1,l)K(k), of Hochschild homology in characteristic zero, or of rational topological K-theory over C implies that the rational noncommutative motive of vanishes. In this way, our results provide a partial answer to a question raised by Sosna. We also establish a deformation-invariance result for phantomness in smooth proper families.

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