Robin de Jong
Published 2006-11-27, updated 2007-05-01Version 3
We show that the gradient and the hessian of the Riemann theta function in dimension n can be combined to give a theta function of order n+1 and modular weight (n+5)/2 defined on the theta divisor. It can be seen that the zero locus of this theta function essentially gives the ramification locus of the Gauss map. For jacobians this leads to a description in terms of theta functions and their derivatives of the Weierstrass point locus on the associated Riemann surface.
Comments: 13 pages; section 5 contains shorter proofs
Journal: Rocky Mountain Jnl. Math. 40 (2010), 155--176
Gauss map on the theta divisor and Green's functions
A Riemann singularity theorem for integral curves
Cubic threefolds and abelian varieties of dimension five. II
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