

Seminar on Complex Analysis (Gonchar Seminar)
June 5, 2017 17:00, Moscow, Steklov Mathematical Institute, Room 411 (8 Gubkina)






Thomae formula for Abelian covers of the Sphere
Ya. Kopeliovich^{} ^{} University of Connecticut

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Abstract:
Let $f\colon X\mapsto\mathbb{CP}^{1}$ be an Abelian cover of the sphere with $A$ as a group of automorphisms and $\lambda_1,…,\lambda_k$ be the ramification points of the cover. In this work we construct nonspecial divisors supported on $f^{1}(\lambda_k)$. We evaluate theta functions on the images of these divisors in the Jacobian of $X$ and show that up to a certain constant not dependent on $\tau$, the period of the curve, these values are polynomials in $\lambda_1,…,\lambda_k.$ This work generalizes the work of Thomae for Hyperelliptic curves and Bershadsky and Radul for nonsingular covers. (Joint with Shaul Zemel from Hebrew University).
Language: English

