Deligne-Beilinson cycle maps for Lichtenbaum cohomology

Abstract

We define Deligne-Beilinson cycle maps for Lichtenbaum cohomology HLm(X, Z(n)) and that with compact supports Hc,Lm(X, Z(n)) of an arbitrary complex algebraic variety X. When (m,n)=(2,1), the homological part of our cycle map with compact supports gives a generalization of the Abel-Jacobi theorem and its projection to the Betti cohomology yields that of the Lefschetz theorem on (1,1)-cycles for arbitrary complex algebraic varieties. In general degrees (m,n), we show that the Deligne-Beilinson cycle maps are always surjective on torsion and have torsion-free cokernels. If m ≤ 2n, the version with compact supports induces an isomorphism on torsion, and so does the one without compact supports if min \2m-1, 2 X+1 \ ≤ 2n. We also characterize the algebraic part of Griffiths's intermediate Jacobians with a universal property.