中科院数学与系统科学研究院
数学研究所
学术报告会
报告人:潘宣余 (Washington University in St. Louis)
题 目:Griffiths groups and Chow groups
时 间:01.04 (星期一) ,10:30—11:30
地 点:数学院南楼N913室
摘 要:
In this talk, I will talk about my work on the Griffiths groups of Fano varieties of lines and the second Chow groups of "3-Fano" hypersurfaces. In fact, we answer a question of Professor Voisin in some cases.
More precisely, we prove that the first Griffiths groups of Fano varieties of lines of "2-Fano" hypersurfaces are trivial and the second Chow groups of "3-Fano" hypersurfaces are torsion-free and of rank one. The proof is based on Tsen-Lang theorem, moduli space of stable maps, bend-and-break theorem and the geometry of quadric surfaces in a hypersurface.
Reference: 2-Cycles on Higher Fano Hypersurfaces (Arxiv)
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