Proceedings of the American Mathematical Society

Infinitely generated Lawson homology groups on some rational projective varieties

Author(s): Wenchuan Hu
Journal: Proc. Amer. Math. Soc. 137 (2009), 2251-2264.
MSC (2000): Primary 14F43; Secondary 55Pxx
Posted: December 23, 2008
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Abstract: We construct rational projective 4-dimensional varieties with the property that certain Lawson homology groups tensored with ${ \mathbb{Q}}$ are infinite dimensional ${\mathbb{Q}}$ -vector spaces. More generally, for each pair of integers

and

, with $k\geq 0$ ,

, we find a projective variety

such that $L_pH_{2p+k}(Y)$ is infinitely generated.

We also construct two singular rational projective 3-dimensional varieties

and

with the same homeomorphism type but different Lawson homology groups; specifically,

is not isomorphic to

even up to torsion.

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