Dick Hain (Duke University)
The Beauville splitting of the Chow groups of the Jacobian of a general curve
Beauville showed that the Chow ring (tensored with the rationals) of an abelian variety splits into eigenspaces under multiplication by an integer \(m>1\). It it not well understood how many of these eigenspaces can be non-zero. In this talk I will give a preliminary report on work whose goal is to show that almost all eigencomponents of the class of a general curve (of sufficiently high genus) in its Jacobian are non-zero. This work makes essential use of recent work of Church and Farb on the homology of Torelli groups.
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We will take the speaker to lunch before the talk.
See the Algebra Seminar web page for information about other seminars in the series.
John Enyang [email protected]