Samuel Grushevsky
Published 2005-03-02Version 1
We discuss the conjecture of Buchstaber and Krichever that their multi-dimensional vector addition formula for Baker-Akhiezer functions characterizes Jacobians among principally polarized abelian varieties, and prove that it is indeed a weak characterization, i.e. that it is true up to additional components, or true precisely under a general position assumption. We also show that this addition formula is equivalent to Gunning's multisecant formula for the Kummer variety. We then use Buchstaber-Krichever's computation of the coefficients in the addition formula to obtain cubic relations among theta functions, which (weakly) characterize the locus of hyperelliptic Jacobians among irreducible abelian varieties. In genus 3 our equations are equivalent to the vanishing of one theta-null, and thus are known classically by work of Mumford and Poor, but already for genus 4 they appear to be new.
Journal: Asian J Math, vol 8 (2004) no. 1, special issue dedicated to Yum-Tong Siu on his 60th birthday
On the non-Transversality of the Hyperelliptic Locus and the Supersingular Locus for $g=3$
The infinite topology of the hyperelliptic locus in Torelli space
On spinor varieties and their secants
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