Seminar talk, 10 February 2021: Difference between revisions
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{{Talk | {{Talk | ||
| speaker = Alexey Samokhin | | speaker = Alexey Samokhin | ||
| title = On | | title = On monotonic pattern in periodic boundary solutions of cylindrical and spherical Kortweg-de Vries-Burgers equations | ||
| abstract = We studied, for the Kortweg-de Vries Burgers equations on cylindrical and spherical waves, the development of a regular profile starting from an equilibrium under a periodic perturbation at the boundary. | | abstract = We studied, for the Kortweg-de Vries Burgers equations on cylindrical and spherical waves, the development of a regular profile starting from an equilibrium under a periodic perturbation at the boundary. | ||
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The explicit asymptotic formulas for the monotonic part, the head shock and a median of the oscillating part are found. | The explicit asymptotic formulas for the monotonic part, the head shock and a median of the oscillating part are found. | ||
| video = | |||
| slides = | Language: English | ||
| video = https://video.gdeq.org/GDEq-zoom-seminar-20210210-Alexey_Samokhin.mp4 | |||
| slides = [[Media:zoom-lab 6-eng.pdf|zoom-lab 6-eng.pdf]] | |||
| references = | | references = | ||
| 79YY-MM-DD = 7978-97-89 | | 79YY-MM-DD = 7978-97-89 | ||
}} | }} | ||
Latest revision as of 08:40, 4 January 2025
Speaker: Alexey Samokhin
Title: On monotonic pattern in periodic boundary solutions of cylindrical and spherical Kortweg-de Vries-Burgers equations
Abstract:
We studied, for the Kortweg-de Vries Burgers equations on cylindrical and spherical waves, the development of a regular profile starting from an equilibrium under a periodic perturbation at the boundary.
The regular profile at the vicinity of perturbation looks like a periodical chain of shock fronts with decreasing amplitudes. Further on, shock fronts become decaying smooth quasi periodic oscillations. After the oscillations cease, the wave develops as a monotonic convex wave, terminated by a head shock of a constant height and equal velocity. This velocity depends on integral characteristics of a boundary condition and on spatial dimensions.
The explicit asymptotic formulas for the monotonic part, the head shock and a median of the oscillating part are found.
Language: English
Video
Slides: zoom-lab 6-eng.pdf