English

T-motives

Algebraic Geometry 2018-04-16 v2 Category Theory K-Theory and Homology Logic

Abstract

Considering a (co)homology theory T\mathbb{T} on a base category C\mathcal{C} as a fragment of a first-order logical theory we here construct an abelian category A[T]\mathcal{A}[\mathbb{T}] which is universal with respect to models of T\mathbb{T} in abelian categories. Under mild conditions on the base category C\mathcal{C}, e.g. for the category of algebraic schemes, we get a functor from C\mathcal{C} to Ch(Ind(A[T])){\rm Ch}({\rm Ind}(\mathcal{A}[\mathbb{T}])) the category of chain complexes of ind-objects of A[T]\mathcal{A}[\mathbb{T}]. This functor lifts Nori's motivic functor for algebraic schemes defined over a subfield of the complex numbers. Furthermore, we construct a triangulated functor from D(Ind(A[T]))D({\rm Ind}(\mathcal{A}[\mathbb{T}])) to Voevodsky's motivic complexes.

Keywords

Cite

@article{arxiv.1602.05053,
  title  = {T-motives},
  author = {L. Barbieri-Viale},
  journal= {arXiv preprint arXiv:1602.05053},
  year   = {2018}
}

Comments

Added reference to arXiv:1604.00153 [math.AG]

R2 v1 2026-06-22T12:51:22.262Z