Fay's trisecant identity
In algebraic geometry, Fay's trisecant identity is an identity between theta functions of Riemann surfaces introduced by Fay (1973, chapter 3, page 34, formula 45). Fay's identity holds for theta functions of Jacobians of curves, but not for theta functions of general abelian varieties.
The name "trisecant identity" refers to the geometric interpretation given by (Mumford 1984), who used it to show that the Kummer variety of a genus g Riemann surface, given by the image of the map from the Jacobian to projective space of dimension 2g – 1 induced by theta functions of order 2, has a 4-dimensional space of trisecants.
Statement
Suppose that
- C is a compact Riemann surface
- g is the genus of C
- θ is the Riemann theta function of C, a function from Cg to C
- E is a prime form on C×C
- u,v,x,y are points of C
- z is an element of Cg
- ω is a 1-form on C with values in Cg
The Fay's identity states that
[math]\displaystyle{ \begin{align} &E(x,v)E(u,y)\theta\left(z+\int_u^x\omega\right)\theta\left(z+\int_v^y\omega\right)\\ - &E(x,u)E(v,y)\theta\left(z+\int_v^x\omega\right)\theta\left(z+\int_u^y\omega\right)\\ = &E(x,y)E(u,v)\theta(z)\theta\left(z+\int_{u+v}^{x+y}\omega\right) \end{align} }[/math]
with
[math]\displaystyle{ \begin{align} &\int_{u+v}^{x+y}\omega=\int_u^x\omega+\int_v^y\omega=\int_u^y\omega+\int_v^x\omega \end{align} }[/math]
References
- Fay, John D. (1973), Theta functions on Riemann surfaces, Lecture Notes in Mathematics, 352, Berlin, New York: Springer-Verlag, doi:10.1007/BFb0060090, ISBN 978-3-540-06517-3
- Mumford, David (1974), "Prym varieties. I", in Ahlfors, Lars V.; Kra, Irwin; Nirenberg, Louis et al., Contributions to analysis (a collection of papers dedicated to Lipman Bers), Boston, MA: Academic Press, pp. 325–350, ISBN 978-0-12-044850-0
- Mumford, David (1984), Tata lectures on theta. II, Progress in Mathematics, 43, Boston, MA: Birkhäuser Boston, ISBN 978-0-8176-3110-9
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