English

Decomposition de motifs abeliens

Algebraic Geometry 2014-10-01 v2

Abstract

Let A be an abelian variety and let us fix a Weil cohomology with coefficients in F. Let H1(A,F)H^1(A,F) be the first cohomology group of A and Lef(A)GL(H1(A,F))Lef(A) \subset GL(H^1(A,F)) be its Lefschetz group, i.e. the sub-group of GL(H1(A,F))GL(H^1(A,F)) of linear applications commuting with endomorphisms of A and respecting the pairing induced by a polarization. We give an explicit presentation of a Q\mathbb{Q}-algebra of correspondences Bi,rB_{i,r} such that the cycle class map induces an isomorphism clBi,r:Bi,rQFEndLef(A)(Hi(Ar,F)).cl_{|_{B_{i,r}}}: B_{i,r} \otimes_{\mathbb{Q}} F \cong End_{Lef(A)}(H^i(A^r,F)). We also give relative versions of this result. We deduce in particular the following fact. Let S=SK(G,X)S=S_K(G,\mathcal{X}) be a Shimura variety of PEL type. Then the functor \textit{canonical construction} μ:Rep(G)VHS(S(C)){\mu: Rep (G) \rightarrow VHS(S(\mathbb{C}))} lifts to a functor μ~:Rep(G)CHM(S)Q{\tilde{\mu}: Rep (G) \rightarrow CHM(S)_{\mathbb{Q}}}, where CHM(S)QCHM(S)_{\mathbb{Q}} is the category of relative Chow motives.

Keywords

Cite

@article{arxiv.1305.2874,
  title  = {Decomposition de motifs abeliens},
  author = {Giuseppe Ancona},
  journal= {arXiv preprint arXiv:1305.2874},
  year   = {2014}
}

Comments

Final version. Added application to PEL Shimura varieties. 22 pages, in french, Manuscripta Math., 2014

R2 v1 2026-06-22T00:15:42.593Z