Algebraic construction of the sigma function for general Weierstrass curves

Abstract

The Weierstrass curve X is a smooth algebraic curve determined by the Weierstrass canonical form, yr + A1(x) yr-1 + A2(x) yr-2 +·s + Ar-1(x) y + Ar(x)=0, where r is a positive integer, and each Aj is a polynomial in x with a certain degree. It is known that every compact Riemann surface has a Weierstrass curve X which is birational to the surface. The form provides the projection r : X P as a covering space. Let RX := H0(X, OX(*∞)) and RP := H0(P, OP(*∞)). Recently we have the explicit description of the complementary module RXc of RP-module RX, which leads the explicit expressions of the holomorphic one form except ∞, H0(P, AP(*∞)) and the trace operator pX such that pX(P, Q)=δP,Q for r(P)=r(Q) for P, Q ∈ X\∞\. In terms of them, we express the fundamental 2-form of the second kind and a connection to the sigma functions for X.

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