Algebraic de Rham theorem and Baker–Akhiezer function
- 作者: Krichever I.M.1,2, Takhtadzhyan L.A.3,4
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隶属关系:
- Columbia University
- Skolkovo Institute of Science and Technology
- Department of Mathematics, Stony Brook University
- Euler International Mathematical Institute
- 期: 卷 88, 编号 3 (2024)
- 页面: 101-110
- 栏目: Articles
- URL: https://journal-vniispk.ru/1607-0046/article/view/257717
- DOI: https://doi.org/10.4213/im9533
- ID: 257717
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详细
For the case of algebraic curves (compact Riemann surfaces), it is shown thatde Rham cohomology group $H^1_{\mathrm{dR}}(X,\mathbb{C})$ of a genus $g$of the Riemann surface $X$ has a natural structure of a symplectic vector space.Every choice of a non-special effective divisor $D$ of degree $g$ on $X$defines a symplectic basis of $H^1_{\mathrm{dR}}(X,\mathbb{C})$ consistingof holomorphic differentials and differentials of the second kind with poleson $D$. This result, which is the algebraic de Rham theorem, is used to describethe tangent space to Picard and Jacobian varieties of $X$in terms of differentials of the second kind, and to define a naturalvector fields on the Jacobian of the curve $X$ that move points of the divisor $D$.In terms of the Lax formalism on algebraic curves, these vector fieldscorrespond to the Dubrovin equations in the theory of integrable systems,and the Baker–Akhierzer function is naturally obtained by the integration alongthe integral curves.
作者简介
Igor Krichever
Columbia University; Skolkovo Institute of Science and Technology
编辑信件的主要联系方式.
Email: krichev@math.columbia.edu
ORCID iD: 0000-0002-7173-6272
Scopus 作者 ID: 6603725451
Researcher ID: AAJ-8553-2021
Doctor of physico-mathematical sciences, Professor
Leon Takhtadzhyan
Department of Mathematics, Stony Brook University; Euler International Mathematical Institute
Email: leontak@math.stonybrook.edu
Doctor of physico-mathematical sciences, Head Scientist Researcher
参考
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