Zero-cycle groups on algebraic varieties

F. Binda, A. Krishna
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引用次数: 7

Abstract

We compare various groups of 0-cycles on quasi-projective varieties over a field. As applications, we show that for certain singular projective varieties, the Levine-Weibel Chow group of 0-cycles coincides with the corresponding Friedlander-Voevodsky motivic cohomology. We also show that over an algebraically closed field of positive characteristic, the Chow group of 0-cycles with modulus on a smooth projective variety with respect to a reduced divisor coincides with the Suslin homology of the complement of the divisor. We prove several generalizations of the finiteness theorem of Saito and Sato for the Chow group of 0-cycles over p-adic fields. We also use these results to deduce a torsion theorem for Suslin homology which extends a result of Bloch to open varieties.
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代数变异上的零环群
我们比较了域上拟射影变异上的各种0环群。作为应用,我们证明了对于某些奇异射影变,0环的Levine-Weibel Chow群与相应的Friedlander-Voevodsky动机上同。我们还证明了在一个具有正特征的代数闭域上,关于一个约除数的光滑射影变化上具有模的0环的Chow群与该除数的补的Suslin同调是一致的。证明了p进域上0环的Chow群的Saito和Sato有限定理的几个推广。我们还利用这些结果推导出了Suslin同调的一个扭转定理,该定理将Bloch的结果推广到开变。
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