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Auteurs principaux: Dragovic, Vladimir, Shramchenko, Vasilisa
Format: Preprint
Publié: 2025
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Accès en ligne:https://arxiv.org/abs/2512.06168
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author Dragovic, Vladimir
Shramchenko, Vasilisa
author_facet Dragovic, Vladimir
Shramchenko, Vasilisa
contents We consider a family of genus $g$ hyperelliptic curves as double ramified coverings over the Riemann sphere with the set of branch points of the form $\{0, \infty, x_1, \dots, x_g, u_1, \dots, u_g\}$. The branch point at infinity $P_\infty$ is selected to be a marked point on the Riemann surfaces. A meromorphic differential $Ω$ with a unique pole being of order two at $P_\infty$, is completely defined by the values of half of its periods, the $a$-periods. Fixing values of $a$-periods of $Ω$, we then find a continuous subfamily in the considered family of hyperelliptic curves along which all the periods of $Ω$ are constant. This subfamily is defined by the functions $u_j(x_1, \dots, x_g)$, while $x_1, \dots, x_g$ are independent parameters. We derive a system of differential equations for the functions $u_j(x_1, \dots, x_g)$, which, remarkably, has rational coefficients. We call this subfamily the isoperiodic deformations of the hyperelliptic curves relative to the given differential of the second kind $Ω.$ We deduce necessary and sufficient conditions for the existence and uniqueness of isoperiodic deformations. We discuss reality conditions as well. Using the obtained results, we solve the following problem for the Korteweg-de Vries and sine-Gordon equations: starting from an algebro-geometric data which generate a real periodic solution of a period $T$, how to deform the data, so that the associated solutions remain periodic with the same period $T$.
format Preprint
id arxiv_https___arxiv_org_abs_2512_06168
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Deformations of the Hill curves and isoperiodicity in the KdV and the sine-Gordon equations
Dragovic, Vladimir
Shramchenko, Vasilisa
Algebraic Geometry
Mathematical Physics
Analysis of PDEs
Exactly Solvable and Integrable Systems
14D07, 35B10, 14H70,
We consider a family of genus $g$ hyperelliptic curves as double ramified coverings over the Riemann sphere with the set of branch points of the form $\{0, \infty, x_1, \dots, x_g, u_1, \dots, u_g\}$. The branch point at infinity $P_\infty$ is selected to be a marked point on the Riemann surfaces. A meromorphic differential $Ω$ with a unique pole being of order two at $P_\infty$, is completely defined by the values of half of its periods, the $a$-periods. Fixing values of $a$-periods of $Ω$, we then find a continuous subfamily in the considered family of hyperelliptic curves along which all the periods of $Ω$ are constant. This subfamily is defined by the functions $u_j(x_1, \dots, x_g)$, while $x_1, \dots, x_g$ are independent parameters. We derive a system of differential equations for the functions $u_j(x_1, \dots, x_g)$, which, remarkably, has rational coefficients. We call this subfamily the isoperiodic deformations of the hyperelliptic curves relative to the given differential of the second kind $Ω.$ We deduce necessary and sufficient conditions for the existence and uniqueness of isoperiodic deformations. We discuss reality conditions as well. Using the obtained results, we solve the following problem for the Korteweg-de Vries and sine-Gordon equations: starting from an algebro-geometric data which generate a real periodic solution of a period $T$, how to deform the data, so that the associated solutions remain periodic with the same period $T$.
title Deformations of the Hill curves and isoperiodicity in the KdV and the sine-Gordon equations
topic Algebraic Geometry
Mathematical Physics
Analysis of PDEs
Exactly Solvable and Integrable Systems
14D07, 35B10, 14H70,
url https://arxiv.org/abs/2512.06168