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Main Author: Skrypnyk, Taras
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2508.03107
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author Skrypnyk, Taras
author_facet Skrypnyk, Taras
contents In the present paper, using a modification of the method of vector fields $Z_i$ of the bi-Hamiltonian theory of separation of variables (SoV), we construct symmetric non-Stäckel variable separation for three-dimensional extension of the Clebsch model, which is equivalent (in the bi-Hamiltonian sense) to the system of interacting Manakov (Schottky-Frahm) and Euler tops. For the obtained symmetric SoV (contrary to the previously constructed asymmetric one), all curves of separation are the same and have genus five. It occurred that the difference between the symmetric and asymmetric cases is encoded in the different form of the vector fields $Z$ used to construct separating polynomial. We explicitly construct coordinates and momenta of separation and Abel-type equations in the considered examples of symmetric SoV for the extended Clebsch and Manakov models.
format Preprint
id arxiv_https___arxiv_org_abs_2508_03107
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Symmetric Separation of Variables for the Extended Clebsch and Manakov Models
Skrypnyk, Taras
Exactly Solvable and Integrable Systems
Mathematical Physics
In the present paper, using a modification of the method of vector fields $Z_i$ of the bi-Hamiltonian theory of separation of variables (SoV), we construct symmetric non-Stäckel variable separation for three-dimensional extension of the Clebsch model, which is equivalent (in the bi-Hamiltonian sense) to the system of interacting Manakov (Schottky-Frahm) and Euler tops. For the obtained symmetric SoV (contrary to the previously constructed asymmetric one), all curves of separation are the same and have genus five. It occurred that the difference between the symmetric and asymmetric cases is encoded in the different form of the vector fields $Z$ used to construct separating polynomial. We explicitly construct coordinates and momenta of separation and Abel-type equations in the considered examples of symmetric SoV for the extended Clebsch and Manakov models.
title Symmetric Separation of Variables for the Extended Clebsch and Manakov Models
topic Exactly Solvable and Integrable Systems
Mathematical Physics
url https://arxiv.org/abs/2508.03107