Seminar talk, 28 April 2021: Difference between revisions
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In particular, we report on the development of two methods in the variable separation theory: | In particular, we report on the development of two methods in the variable separation theory: | ||
# the method of the differential separability conditions; | # the method of the differential separability conditions; | ||
# the method of the vector fields Z. | # the method of the vector fields <math>Z</math>. | ||
Using these two methods we construct an asymmetric variable separation for the Clebsch model. Our SoV is unusual: it is characterized by two different curves of separation. We explicitly construct coordinates and momenta of separation, the reconstruction formulae and the Abel-type quadratures for the Clebsch system. The solution of the non-standard Abel-Jacobi inversion problem is briefly discussed. | Using these two methods we construct an asymmetric variable separation for the Clebsch model. Our SoV is unusual: it is characterized by two different curves of separation. We explicitly construct coordinates and momenta of separation, the reconstruction formulae and the Abel-type quadratures for the Clebsch system. The solution of the non-standard Abel-Jacobi inversion problem is briefly discussed. | ||
Language: English | Language: English | ||
| video = | | video = https://video.gdeq.org/GDEq-zoom-seminar-20210428-Taras_Skrypnyk.mp4 | ||
| slides = | | slides = [[Media:ClebschTranspNew.pdf|ClebschTranspNew.pdf]] | ||
| references = | | references = | ||
| 79YY-MM-DD = 7978-95-71 | | 79YY-MM-DD = 7978-95-71 | ||
}} | }} | ||
Latest revision as of 08:40, 4 January 2025
Speaker: Taras Skrypnyk
Title: Asymmetric variable separation for the Clebsch model
Abstract:
In the present talk we present our result on separation of variables (SoV) for the Clebsch model.
In particular, we report on the development of two methods in the variable separation theory:
- the method of the differential separability conditions;
- the method of the vector fields .
Using these two methods we construct an asymmetric variable separation for the Clebsch model. Our SoV is unusual: it is characterized by two different curves of separation. We explicitly construct coordinates and momenta of separation, the reconstruction formulae and the Abel-type quadratures for the Clebsch system. The solution of the non-standard Abel-Jacobi inversion problem is briefly discussed.
Language: English
Video
Slides: ClebschTranspNew.pdf