Integrable discrete Schrödinger equations and a characterization of Prym varieties by a pair of quadrisecants

Samuel Grushevsky; Igor Krichever

doi:10.1215/00127094-2010-014

Integrable discrete Schrödinger equations and a characterization of Prym varieties by a pair of quadrisecants

Samuel Grushevsky
, Igor Krichever

Simons Center for Geometry & Physics

Columbia University
Landau Inst. for Theoretical Physics

Research output: Contribution to journal › Article › peer-review

16 Scopus citations

Abstract

We prove that Prym varieties are characterized geometrically by the existence of a symmetric pair of quadrisecant planes of the associated Kummer variety. We also show that Prym varieties are characterized by certain (new) theta-functional equations. For this purpose we construct and study a difference-differential analog of the Novikov-Veselov hierarchy.

Original language	English
Pages (from-to)	317-371
Number of pages	55
Journal	Duke Mathematical Journal
Volume	152
Issue number	2
DOIs	https://doi.org/10.1215/00127094-2010-014
State	Published - Apr 2010

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abstract = "We prove that Prym varieties are characterized geometrically by the existence of a symmetric pair of quadrisecant planes of the associated Kummer variety. We also show that Prym varieties are characterized by certain (new) theta-functional equations. For this purpose we construct and study a difference-differential analog of the Novikov-Veselov hierarchy.",

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N2 - We prove that Prym varieties are characterized geometrically by the existence of a symmetric pair of quadrisecant planes of the associated Kummer variety. We also show that Prym varieties are characterized by certain (new) theta-functional equations. For this purpose we construct and study a difference-differential analog of the Novikov-Veselov hierarchy.

AB - We prove that Prym varieties are characterized geometrically by the existence of a symmetric pair of quadrisecant planes of the associated Kummer variety. We also show that Prym varieties are characterized by certain (new) theta-functional equations. For this purpose we construct and study a difference-differential analog of the Novikov-Veselov hierarchy.

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U2 - 10.1215/00127094-2010-014

DO - 10.1215/00127094-2010-014

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JF - Duke Mathematical Journal

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Integrable discrete Schrödinger equations and a characterization of Prym varieties by a pair of quadrisecants

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