English

Complementary Modules of Weierstrass Canonical Forms

Algebraic Geometry 2023-04-13 v8 Exactly Solvable and Integrable Systems

Abstract

The Weierstrass curve is a pointed curve (X,)(X,\infty) with a numerical semigroup HXH_X, which is a normalization of the curve given by the Weierstrass canonical form, yr+A1(x)yr1+A2(x)yr2++Ar1(x)y+Ar(x)=0y^r + A_{1}(x) y^{r-1} + A_{2}(x) y^{r-2} +\dots + A_{r-1}(x) y + A_{r}(x)=0 where each AjA_j is a polynomial in xx of degree js/r\leq j s/r for certain coprime positive integers rr and ss, rr<ss, such that the generators of the Weierstrass non-gap sequence HXH_X at \infty include rr and ss. The Weierstrass curve has the projection ϖr ⁣:XP\varpi_r\colon X \to {\mathbb P}, (x,y)x(x,y)\mapsto x, as a covering space. Let RX:=H0(X,OX())R_X := {\mathbf H}^0(X, {\mathcal O}_X(*\infty)) and RP:=H0(P,OP())R_{\mathbb P} := {\mathbf H}^0({\mathbb P}, {\mathcal O}_{\mathbb P}(*\infty)) whose affine part is C[x]{\mathbb C}[x]. In this paper, for every Weierstrass curve XX, we show the explicit expression of the complementary module RXcR_X^{\mathfrak c} of RPR_{\mathbb P}-module RXR_X as an extension of the expression of the plane Weierstrass curves by Kunz. The extension naturally leads the explicit expressions of the holomorphic one form except \infty, H0(P,AP()){\mathbf H}^0({\mathbb P}, {\mathcal A}_{\mathbb P}(*\infty)) in terms of RXR_X. Since for every compact Riemann surface, we find a Weierstrass curve that is bi-rational to the surface, we also comment that the explicit expression of RXcR_X^{\mathfrak c} naturally leads the algebraic construction of generalized Weierstrass' sigma functions for every compact Riemann surface and is also connected with the data on how the Riemann surface is embedded into the universal Grassmannian manifolds.

Keywords

Cite

@article{arxiv.2207.01905,
  title  = {Complementary Modules of Weierstrass Canonical Forms},
  author = {Jiryo Komeda and Shigeki Matsutani and Emma Previato},
  journal= {arXiv preprint arXiv:2207.01905},
  year   = {2023}
}
R2 v1 2026-06-24T12:14:13.279Z