Holmstrom Lawson homology

Lawson homology

Application to filtrations on algebraic cycles: http://www.math.uiuc.edu/K-theory/0038. See also http://www.math.uiuc.edu/K-theory/0039.

Friedlander and Mazur


Lawson homology

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Lawson homology

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Lawson homology

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Lawson homology

See also Morphic cohomology


Lawson homology

dos Santos on Lawson homology for real varieties

Lawson homology for abelian varieties: http://front.math.ucdavis.edu/1110.3505

Teh on motivic integration and algebraic cycles

arXiv:0912.0727 Lawson Homology for projective varieties with C^-action from arXiv Front: math.AG by Wenchuan Hu The Lawson homology of a smooth projective variety with a C *\C^*-action is given in terms of that of the fixed point set of this action. We also consider such a decomposition for the Lawson homology of certain singular projective varieties with a C *\C^*-action. As applications, we calculate the Lawson homology and higher Chow groups for several examples.

arXiv:1101.4990 On Hard Lefschetz Conjecture on Lawson Homology from arXiv Front: math.AG by Ze Xu Friedlander and Mazur proposed a conjecture of hard Lefschetz type on Lawson homology. We shall relate this conjecture to Suslin conjecture on Lawson homology. For abelian varieties, this conjecture is shown to be equivalent to a vanishing conjecture of Beauville type on Lawson homology. For symmetric products of curves, we show that this conjecture amounts to the vanishing conjecture of Beauville type for the Jacobians of the corresponding curves. As a consequence, Suslin conjecture holds for all symmetric products of curves with genus at most 2.

nLab page on Lawson homology

Created on June 10, 2014 at 21:14:54 by Andreas Holmström