Another proof of a conjecture of S. P. Novikov on periods of Abelian integrals on Riemann surfaces (Q1093696)
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scientific article; zbMATH DE number 4023465
| Language | Label | Description | Also known as |
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| English | Another proof of a conjecture of S. P. Novikov on periods of Abelian integrals on Riemann surfaces |
scientific article; zbMATH DE number 4023465 |
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Another proof of a conjecture of S. P. Novikov on periods of Abelian integrals on Riemann surfaces (English)
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1987
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\textit{T. Shiota} [Invent. Math. 83, 333-382 (1986; Zbl 0626.35097)] proved the conjecture of Novikov which asserts that a principally polarized abelian variety is a Jacobian variety if the Riemann theta function satisfies the Kadomtsev-Petviashvili (briefly, K-P) equations. In this paper, the authors shorten Shiota's proof from a geometrical view point. The geometrical interpretation of the criterion of the Jacobian varieties by using the K-P hierarchy is given by \textit{G. Welters} [Ann. Math., II. Ser. 120, 497-504 (1984; Zbl 0574.14027)]. The authors reduce the Novikov conjecture to the criterion of Welters of Jacobian varieties by using essentially Shiota's lemma.
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K-P equations
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principally polarized abelian variety
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Jacobian variety
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Novikov conjecture
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0.8650371
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0.8642267
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0.8604949
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0.8557331
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